A McCool Whitehead type theorem for finitely generated subgroups of Out(Fn)

Abstract

S. Gersten announced an algorithm that takes as input two finite sequences K=(K1,…, KN) and K'=(K1',…, KN') of conjugacy classes of finitely generated subgroups of Fn and outputs: (1) YES or NO depending on whether or not there is an element θ∈ Out(Fn) such that θ( K)= K' together with one such θ if it exists and (2) a finite presentation for the subgroup of Out(Fn) fixing K. S. Kalajdzievski published a verification of this algorithm. We present a different algorithm from the point of view of Culler-Vogtmann's Outer space. New results include that the subgroup of Out(Fn) fixing K is of type VF, an equivariant version of these results, an application, and a unified approach to such questions.