Aperiodicity properties of automorphism groups of free products

Abstract

Let G=G1 … Gk FN be a free product of finitely presented groups, where FN is a free group of rank N ∈ N. Let Out(G,G) be the subgroup of Out(G) preserving the set of conjugacy classes G=\[G1],…,[Gk]\. Under natural conditions on the groups Gi with i ∈ \1,…,k\, we prove that the group Out(G,G) has a finite index subgroup IA(G,G,3) with notable aperiodicity properties. We show that the group IA(G,G,3) is torsion free and, if φ ∈ IA(G,G,3), every φ-periodic conjugacy class of elements of G is in fact fixed by φ and every φ-periodic conjugacy class of free factors of G is fixed by φ. As an application, we prove that, for every toral relatively hyperbolic group G, the group Out(G) has a finite index subgroup IA(G,3) with the same above mentioned aperiodicity properties. We in particular give another proof of the theorem, due to Handel-Mosher, that the kernel of the action of Out(FN) on H1(FN,Z/3Z) satisfies natural aperiodicity properties.