The Tits alternative for the automorphism group of a free product

Abstract

Let G=G1… Gk F be a countable group which splits as a free product, where all groups Gi are freely indecomposable and not isomorphic to Z, and F is a finitely generated free group. If for all i∈\1,…,k\, both Gi and its outer automorphism group Out(Gi) satisfy the Tits alternative, then Out(G) satisfies the Tits alternative. As an application, we prove that the Tits alternative holds for outer automorphism groups of right-angled Artin groups, and of torsion-free groups that are hyperbolic relative to a finite family of virtually polycyclic groups.