Combinatorial Characterizations of Virtually Torsion-Free and Virtually Free Groups

We establish combinatorial characterizations of virtually torsion-free and virtually free groups using the canonical graph decomposition theory in DJKK22. Our main results show that a finitely presented, residually finite group Γ is virtually torsion-free if and only if there exists a locality parameter r>0 such that its r-local cover admits a canonical tree-decomposition with finite quotient and finite adhesion, every finite subgroup of Γ fixes a vertex of this decomposition, and the finite subgroups in each bag have uniformly bounded order. Moreover, a finitely generated group Γ is virtually free if and only if for some r>0 its r-global decomposition has a finite model graph with finite bags and the tree-decomposition of the r-local cover is Γ-equivariantly isomorphic to the Bass--Serre tree arising from a splitting of Γ as a finite graph of finite groups.