Free representations of outer automorphism groups of free products via characteristic abelian coverings

Abstract

Given a free product G, we investigate the existence of faithful free representations of the outer automorphism group Out(G), or in other words of embeddings of Out(G) into Out(Fm) for some m. This is based on a work of Bridson and Vogtmann in which they construct embeddings of Out(Fn) into Out(Fm) for some values of n and m by interpreting Out(Fn) as the group of homotopy equivalences of a graph X of genus n, and by lifting homotopy equivalences of X to a characteristic abelian cover of genus m. Our construction for a free product G, using a presentation of Out(G) due to Fuchs-Rabinovich, is written as an algebraic proof, but it is directly inspired by Bridson and Vogtmann's topological method and can be interpreted as lifting homotopy equivalences of a graph of groups. For instance, we obtain a faithful free representation of Out(G) when G=Fd Gd+1·s Gn, with Fd free of rank d and Gi finite abelian of order coprime to n-1.