Twisted conjugacy in free products

Abstract

Let φ:G G be an automorphism of a group which is a free-product of finitely many groups each of which is freely indecomposable and two of the factors contain proper finite index characteristic subgroups. We show that G has infinitely many φ-twisted conjugacy classes. As an application, we show that if G is the fundamental group of a three-manifold that is not irreducible, then G has property R∞, that is, there are infinitely many φ-twisted conjugacy classes in G for every automorphism φ of G.