| """ |
| A module providing some utility functions regarding Bézier path manipulation. |
| """ |
|
|
| from functools import lru_cache |
| import math |
| import warnings |
|
|
| import numpy as np |
|
|
| from matplotlib import _api |
|
|
|
|
| |
| @np.vectorize |
| @lru_cache(maxsize=128) |
| def _comb(n, k): |
| if k > n: |
| return 0 |
| k = min(k, n - k) |
| i = np.arange(1, k + 1) |
| return np.prod((n + 1 - i)/i).astype(int) |
|
|
|
|
| class NonIntersectingPathException(ValueError): |
| pass |
|
|
|
|
| |
|
|
|
|
| def get_intersection(cx1, cy1, cos_t1, sin_t1, |
| cx2, cy2, cos_t2, sin_t2): |
| """ |
| Return the intersection between the line through (*cx1*, *cy1*) at angle |
| *t1* and the line through (*cx2*, *cy2*) at angle *t2*. |
| """ |
|
|
| |
| |
|
|
| line1_rhs = sin_t1 * cx1 - cos_t1 * cy1 |
| line2_rhs = sin_t2 * cx2 - cos_t2 * cy2 |
|
|
| |
| a, b = sin_t1, -cos_t1 |
| c, d = sin_t2, -cos_t2 |
|
|
| ad_bc = a * d - b * c |
| if abs(ad_bc) < 1e-12: |
| raise ValueError("Given lines do not intersect. Please verify that " |
| "the angles are not equal or differ by 180 degrees.") |
|
|
| |
| a_, b_ = d, -b |
| c_, d_ = -c, a |
| a_, b_, c_, d_ = [k / ad_bc for k in [a_, b_, c_, d_]] |
|
|
| x = a_ * line1_rhs + b_ * line2_rhs |
| y = c_ * line1_rhs + d_ * line2_rhs |
|
|
| return x, y |
|
|
|
|
| def get_normal_points(cx, cy, cos_t, sin_t, length): |
| """ |
| For a line passing through (*cx*, *cy*) and having an angle *t*, return |
| locations of the two points located along its perpendicular line at the |
| distance of *length*. |
| """ |
|
|
| if length == 0.: |
| return cx, cy, cx, cy |
|
|
| cos_t1, sin_t1 = sin_t, -cos_t |
| cos_t2, sin_t2 = -sin_t, cos_t |
|
|
| x1, y1 = length * cos_t1 + cx, length * sin_t1 + cy |
| x2, y2 = length * cos_t2 + cx, length * sin_t2 + cy |
|
|
| return x1, y1, x2, y2 |
|
|
|
|
| |
|
|
| |
| |
|
|
|
|
| def _de_casteljau1(beta, t): |
| next_beta = beta[:-1] * (1 - t) + beta[1:] * t |
| return next_beta |
|
|
|
|
| def split_de_casteljau(beta, t): |
| """ |
| Split a Bézier segment defined by its control points *beta* into two |
| separate segments divided at *t* and return their control points. |
| """ |
| beta = np.asarray(beta) |
| beta_list = [beta] |
| while True: |
| beta = _de_casteljau1(beta, t) |
| beta_list.append(beta) |
| if len(beta) == 1: |
| break |
| left_beta = [beta[0] for beta in beta_list] |
| right_beta = [beta[-1] for beta in reversed(beta_list)] |
|
|
| return left_beta, right_beta |
|
|
|
|
| def find_bezier_t_intersecting_with_closedpath( |
| bezier_point_at_t, inside_closedpath, t0=0., t1=1., tolerance=0.01): |
| """ |
| Find the intersection of the Bézier curve with a closed path. |
| |
| The intersection point *t* is approximated by two parameters *t0*, *t1* |
| such that *t0* <= *t* <= *t1*. |
| |
| Search starts from *t0* and *t1* and uses a simple bisecting algorithm |
| therefore one of the end points must be inside the path while the other |
| doesn't. The search stops when the distance of the points parametrized by |
| *t0* and *t1* gets smaller than the given *tolerance*. |
| |
| Parameters |
| ---------- |
| bezier_point_at_t : callable |
| A function returning x, y coordinates of the Bézier at parameter *t*. |
| It must have the signature:: |
| |
| bezier_point_at_t(t: float) -> tuple[float, float] |
| |
| inside_closedpath : callable |
| A function returning True if a given point (x, y) is inside the |
| closed path. It must have the signature:: |
| |
| inside_closedpath(point: tuple[float, float]) -> bool |
| |
| t0, t1 : float |
| Start parameters for the search. |
| |
| tolerance : float |
| Maximal allowed distance between the final points. |
| |
| Returns |
| ------- |
| t0, t1 : float |
| The Bézier path parameters. |
| """ |
| start = bezier_point_at_t(t0) |
| end = bezier_point_at_t(t1) |
|
|
| start_inside = inside_closedpath(start) |
| end_inside = inside_closedpath(end) |
|
|
| if start_inside == end_inside and start != end: |
| raise NonIntersectingPathException( |
| "Both points are on the same side of the closed path") |
|
|
| while True: |
|
|
| |
| if np.hypot(start[0] - end[0], start[1] - end[1]) < tolerance: |
| return t0, t1 |
|
|
| |
| middle_t = 0.5 * (t0 + t1) |
| middle = bezier_point_at_t(middle_t) |
| middle_inside = inside_closedpath(middle) |
|
|
| if start_inside ^ middle_inside: |
| t1 = middle_t |
| end = middle |
| else: |
| t0 = middle_t |
| start = middle |
| start_inside = middle_inside |
|
|
|
|
| class BezierSegment: |
| """ |
| A d-dimensional Bézier segment. |
| |
| Parameters |
| ---------- |
| control_points : (N, d) array |
| Location of the *N* control points. |
| """ |
|
|
| def __init__(self, control_points): |
| self._cpoints = np.asarray(control_points) |
| self._N, self._d = self._cpoints.shape |
| self._orders = np.arange(self._N) |
| coeff = [math.factorial(self._N - 1) |
| // (math.factorial(i) * math.factorial(self._N - 1 - i)) |
| for i in range(self._N)] |
| self._px = (self._cpoints.T * coeff).T |
|
|
| def __call__(self, t): |
| """ |
| Evaluate the Bézier curve at point(s) *t* in [0, 1]. |
| |
| Parameters |
| ---------- |
| t : (k,) array-like |
| Points at which to evaluate the curve. |
| |
| Returns |
| ------- |
| (k, d) array |
| Value of the curve for each point in *t*. |
| """ |
| t = np.asarray(t) |
| return (np.power.outer(1 - t, self._orders[::-1]) |
| * np.power.outer(t, self._orders)) @ self._px |
|
|
| def point_at_t(self, t): |
| """ |
| Evaluate the curve at a single point, returning a tuple of *d* floats. |
| """ |
| return tuple(self(t)) |
|
|
| @property |
| def control_points(self): |
| """The control points of the curve.""" |
| return self._cpoints |
|
|
| @property |
| def dimension(self): |
| """The dimension of the curve.""" |
| return self._d |
|
|
| @property |
| def degree(self): |
| """Degree of the polynomial. One less the number of control points.""" |
| return self._N - 1 |
|
|
| @property |
| def polynomial_coefficients(self): |
| r""" |
| The polynomial coefficients of the Bézier curve. |
| |
| .. warning:: Follows opposite convention from `numpy.polyval`. |
| |
| Returns |
| ------- |
| (n+1, d) array |
| Coefficients after expanding in polynomial basis, where :math:`n` |
| is the degree of the Bézier curve and :math:`d` its dimension. |
| These are the numbers (:math:`C_j`) such that the curve can be |
| written :math:`\sum_{j=0}^n C_j t^j`. |
| |
| Notes |
| ----- |
| The coefficients are calculated as |
| |
| .. math:: |
| |
| {n \choose j} \sum_{i=0}^j (-1)^{i+j} {j \choose i} P_i |
| |
| where :math:`P_i` are the control points of the curve. |
| """ |
| n = self.degree |
| |
| if n > 10: |
| warnings.warn("Polynomial coefficients formula unstable for high " |
| "order Bezier curves!", RuntimeWarning) |
| P = self.control_points |
| j = np.arange(n+1)[:, None] |
| i = np.arange(n+1)[None, :] |
| prefactor = (-1)**(i + j) * _comb(j, i) |
| return _comb(n, j) * prefactor @ P |
|
|
| def axis_aligned_extrema(self): |
| """ |
| Return the dimension and location of the curve's interior extrema. |
| |
| The extrema are the points along the curve where one of its partial |
| derivatives is zero. |
| |
| Returns |
| ------- |
| dims : array of int |
| Index :math:`i` of the partial derivative which is zero at each |
| interior extrema. |
| dzeros : array of float |
| Of same size as dims. The :math:`t` such that :math:`d/dx_i B(t) = |
| 0` |
| """ |
| n = self.degree |
| if n <= 1: |
| return np.array([]), np.array([]) |
| Cj = self.polynomial_coefficients |
| dCj = np.arange(1, n+1)[:, None] * Cj[1:] |
| dims = [] |
| roots = [] |
| for i, pi in enumerate(dCj.T): |
| r = np.roots(pi[::-1]) |
| roots.append(r) |
| dims.append(np.full_like(r, i)) |
| roots = np.concatenate(roots) |
| dims = np.concatenate(dims) |
| in_range = np.isreal(roots) & (roots >= 0) & (roots <= 1) |
| return dims[in_range], np.real(roots)[in_range] |
|
|
|
|
| def split_bezier_intersecting_with_closedpath( |
| bezier, inside_closedpath, tolerance=0.01): |
| """ |
| Split a Bézier curve into two at the intersection with a closed path. |
| |
| Parameters |
| ---------- |
| bezier : (N, 2) array-like |
| Control points of the Bézier segment. See `.BezierSegment`. |
| inside_closedpath : callable |
| A function returning True if a given point (x, y) is inside the |
| closed path. See also `.find_bezier_t_intersecting_with_closedpath`. |
| tolerance : float |
| The tolerance for the intersection. See also |
| `.find_bezier_t_intersecting_with_closedpath`. |
| |
| Returns |
| ------- |
| left, right |
| Lists of control points for the two Bézier segments. |
| """ |
|
|
| bz = BezierSegment(bezier) |
| bezier_point_at_t = bz.point_at_t |
|
|
| t0, t1 = find_bezier_t_intersecting_with_closedpath( |
| bezier_point_at_t, inside_closedpath, tolerance=tolerance) |
|
|
| _left, _right = split_de_casteljau(bezier, (t0 + t1) / 2.) |
| return _left, _right |
|
|
|
|
| |
|
|
|
|
| def split_path_inout(path, inside, tolerance=0.01, reorder_inout=False): |
| """ |
| Divide a path into two segments at the point where ``inside(x, y)`` becomes |
| False. |
| """ |
| from .path import Path |
| path_iter = path.iter_segments() |
|
|
| ctl_points, command = next(path_iter) |
| begin_inside = inside(ctl_points[-2:]) |
|
|
| ctl_points_old = ctl_points |
|
|
| iold = 0 |
| i = 1 |
|
|
| for ctl_points, command in path_iter: |
| iold = i |
| i += len(ctl_points) // 2 |
| if inside(ctl_points[-2:]) != begin_inside: |
| bezier_path = np.concatenate([ctl_points_old[-2:], ctl_points]) |
| break |
| ctl_points_old = ctl_points |
| else: |
| raise ValueError("The path does not intersect with the patch") |
|
|
| bp = bezier_path.reshape((-1, 2)) |
| left, right = split_bezier_intersecting_with_closedpath( |
| bp, inside, tolerance) |
| if len(left) == 2: |
| codes_left = [Path.LINETO] |
| codes_right = [Path.MOVETO, Path.LINETO] |
| elif len(left) == 3: |
| codes_left = [Path.CURVE3, Path.CURVE3] |
| codes_right = [Path.MOVETO, Path.CURVE3, Path.CURVE3] |
| elif len(left) == 4: |
| codes_left = [Path.CURVE4, Path.CURVE4, Path.CURVE4] |
| codes_right = [Path.MOVETO, Path.CURVE4, Path.CURVE4, Path.CURVE4] |
| else: |
| raise AssertionError("This should never be reached") |
|
|
| verts_left = left[1:] |
| verts_right = right[:] |
|
|
| if path.codes is None: |
| path_in = Path(np.concatenate([path.vertices[:i], verts_left])) |
| path_out = Path(np.concatenate([verts_right, path.vertices[i:]])) |
|
|
| else: |
| path_in = Path(np.concatenate([path.vertices[:iold], verts_left]), |
| np.concatenate([path.codes[:iold], codes_left])) |
|
|
| path_out = Path(np.concatenate([verts_right, path.vertices[i:]]), |
| np.concatenate([codes_right, path.codes[i:]])) |
|
|
| if reorder_inout and not begin_inside: |
| path_in, path_out = path_out, path_in |
|
|
| return path_in, path_out |
|
|
|
|
| def inside_circle(cx, cy, r): |
| """ |
| Return a function that checks whether a point is in a circle with center |
| (*cx*, *cy*) and radius *r*. |
| |
| The returned function has the signature:: |
| |
| f(xy: tuple[float, float]) -> bool |
| """ |
| r2 = r ** 2 |
|
|
| def _f(xy): |
| x, y = xy |
| return (x - cx) ** 2 + (y - cy) ** 2 < r2 |
| return _f |
|
|
|
|
| |
|
|
| def get_cos_sin(x0, y0, x1, y1): |
| dx, dy = x1 - x0, y1 - y0 |
| d = (dx * dx + dy * dy) ** .5 |
| |
| if d == 0: |
| return 0.0, 0.0 |
| return dx / d, dy / d |
|
|
|
|
| def check_if_parallel(dx1, dy1, dx2, dy2, tolerance=1.e-5): |
| """ |
| Check if two lines are parallel. |
| |
| Parameters |
| ---------- |
| dx1, dy1, dx2, dy2 : float |
| The gradients *dy*/*dx* of the two lines. |
| tolerance : float |
| The angular tolerance in radians up to which the lines are considered |
| parallel. |
| |
| Returns |
| ------- |
| is_parallel |
| - 1 if two lines are parallel in same direction. |
| - -1 if two lines are parallel in opposite direction. |
| - False otherwise. |
| """ |
| theta1 = np.arctan2(dx1, dy1) |
| theta2 = np.arctan2(dx2, dy2) |
| dtheta = abs(theta1 - theta2) |
| if dtheta < tolerance: |
| return 1 |
| elif abs(dtheta - np.pi) < tolerance: |
| return -1 |
| else: |
| return False |
|
|
|
|
| def get_parallels(bezier2, width): |
| """ |
| Given the quadratic Bézier control points *bezier2*, returns |
| control points of quadratic Bézier lines roughly parallel to given |
| one separated by *width*. |
| """ |
|
|
| |
| |
| |
| |
|
|
| c1x, c1y = bezier2[0] |
| cmx, cmy = bezier2[1] |
| c2x, c2y = bezier2[2] |
|
|
| parallel_test = check_if_parallel(c1x - cmx, c1y - cmy, |
| cmx - c2x, cmy - c2y) |
|
|
| if parallel_test == -1: |
| _api.warn_external( |
| "Lines do not intersect. A straight line is used instead.") |
| cos_t1, sin_t1 = get_cos_sin(c1x, c1y, c2x, c2y) |
| cos_t2, sin_t2 = cos_t1, sin_t1 |
| else: |
| |
| |
| cos_t1, sin_t1 = get_cos_sin(c1x, c1y, cmx, cmy) |
| cos_t2, sin_t2 = get_cos_sin(cmx, cmy, c2x, c2y) |
|
|
| |
| |
| |
| |
| c1x_left, c1y_left, c1x_right, c1y_right = ( |
| get_normal_points(c1x, c1y, cos_t1, sin_t1, width) |
| ) |
| c2x_left, c2y_left, c2x_right, c2y_right = ( |
| get_normal_points(c2x, c2y, cos_t2, sin_t2, width) |
| ) |
|
|
| |
| |
| |
| try: |
| cmx_left, cmy_left = get_intersection(c1x_left, c1y_left, cos_t1, |
| sin_t1, c2x_left, c2y_left, |
| cos_t2, sin_t2) |
| cmx_right, cmy_right = get_intersection(c1x_right, c1y_right, cos_t1, |
| sin_t1, c2x_right, c2y_right, |
| cos_t2, sin_t2) |
| except ValueError: |
| |
| |
| |
| cmx_left, cmy_left = ( |
| 0.5 * (c1x_left + c2x_left), 0.5 * (c1y_left + c2y_left) |
| ) |
| cmx_right, cmy_right = ( |
| 0.5 * (c1x_right + c2x_right), 0.5 * (c1y_right + c2y_right) |
| ) |
|
|
| |
| |
| path_left = [(c1x_left, c1y_left), |
| (cmx_left, cmy_left), |
| (c2x_left, c2y_left)] |
| path_right = [(c1x_right, c1y_right), |
| (cmx_right, cmy_right), |
| (c2x_right, c2y_right)] |
|
|
| return path_left, path_right |
|
|
|
|
| def find_control_points(c1x, c1y, mmx, mmy, c2x, c2y): |
| """ |
| Find control points of the Bézier curve passing through (*c1x*, *c1y*), |
| (*mmx*, *mmy*), and (*c2x*, *c2y*), at parametric values 0, 0.5, and 1. |
| """ |
| cmx = .5 * (4 * mmx - (c1x + c2x)) |
| cmy = .5 * (4 * mmy - (c1y + c2y)) |
| return [(c1x, c1y), (cmx, cmy), (c2x, c2y)] |
|
|
|
|
| def make_wedged_bezier2(bezier2, width, w1=1., wm=0.5, w2=0.): |
| """ |
| Being similar to `get_parallels`, returns control points of two quadratic |
| Bézier lines having a width roughly parallel to given one separated by |
| *width*. |
| """ |
|
|
| |
| c1x, c1y = bezier2[0] |
| cmx, cmy = bezier2[1] |
| c3x, c3y = bezier2[2] |
|
|
| |
| |
| cos_t1, sin_t1 = get_cos_sin(c1x, c1y, cmx, cmy) |
| cos_t2, sin_t2 = get_cos_sin(cmx, cmy, c3x, c3y) |
|
|
| |
| |
| |
| |
| c1x_left, c1y_left, c1x_right, c1y_right = ( |
| get_normal_points(c1x, c1y, cos_t1, sin_t1, width * w1) |
| ) |
| c3x_left, c3y_left, c3x_right, c3y_right = ( |
| get_normal_points(c3x, c3y, cos_t2, sin_t2, width * w2) |
| ) |
|
|
| |
| |
| c12x, c12y = (c1x + cmx) * .5, (c1y + cmy) * .5 |
| c23x, c23y = (cmx + c3x) * .5, (cmy + c3y) * .5 |
| c123x, c123y = (c12x + c23x) * .5, (c12y + c23y) * .5 |
|
|
| |
| cos_t123, sin_t123 = get_cos_sin(c12x, c12y, c23x, c23y) |
|
|
| c123x_left, c123y_left, c123x_right, c123y_right = ( |
| get_normal_points(c123x, c123y, cos_t123, sin_t123, width * wm) |
| ) |
|
|
| path_left = find_control_points(c1x_left, c1y_left, |
| c123x_left, c123y_left, |
| c3x_left, c3y_left) |
| path_right = find_control_points(c1x_right, c1y_right, |
| c123x_right, c123y_right, |
| c3x_right, c3y_right) |
|
|
| return path_left, path_right |
|
|
