Profinite rigidity for free-by-cyclic groups with centre

Abstract

A free-by-cyclic group FNφZ has non-trivial centre if and only if [φ] has finite order in Out(FN). We establish a profinite ridigity result for such groups: if 1 is a free-by-cyclic group with non-trivial centre and 2 is a finitely generated free-by-cyclic group with the same finite quotients as 1, then 2 is isomorphic to 1. One-relator groups with centre are similarly rigid. We prove that finitely generated free-by-(finite cyclic) groups are profinitely rigid in the same sense; the proof revolves around a finite poset fsc(G) that carries information about the centralisers of finite subgroups of G -- it is a complete invariant for these groups. These results provide contrasts with the lack of profinite rigidity among surface-by-cyclic groups and (free abelian)-by-cyclic groups, as well as general virtually-free groups.