Free-by-cyclic groups are conjugacy separable

Abstract

We show that all finitely generated free-by-cyclic groups are conjugacy separable: if a finitely generated group G surjects onto Z with free kernel, then for every pair of non-conjugate elements g,h∈ G, there exists a finite quotient α:G Q such that α(g) is not conjugate to α(h). This resolves Question 19.41 of the Kourovka Notebook. We apply this to prove that the outer automorphism group of a finitely generated free-by-cyclic group is residually finite. Along the way we prove that if the monodromy of a finitely generated free-by-cyclic group is polynomially growing, then the double cosets of a cyclic subgroup are separable. Our approach combines vertex fillings in graph-of-groups decompositions, and Dehn fillings in relatively hyperbolic groups, according to the different geometric regimes in free-by-cyclic groups.