Translation lengths of outer automorphisms of finitely generated free-by-finite groups
Abstract
Bestvina, Feighn and Handel proved that every subgroup of the outer automorphism group, Out(Fn), of the free group of rank n is either virtually finitely generated abelian or contains a nonabelian free group. In this note we consider the more general situation of the outer automorphism group Out(G) of a finitely generated free-by-finite group G. We show that Out(G) is translation discrete and that every subgroup of Out(G) is either virtually finitely generated abelian or contains a nonabelian free group.
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