The Schur multiplier, profinite completions and decidability

Abstract

We fix a finitely presented group Q and consider short exact sequences 1 N G Q 1 with G finitely generated. The inclusion N G induces a morphism of profinite completions N G. We prove that this is an isomorphism for all N and G if and only if Q is super-perfect and has no proper subgroups of finite index. We prove that there is no algorithm that, given a finitely presented, residually finite group G and a finitely presentable subgroup P⊂ G, can determine whether or not P G is an isomorphism.