Relative Schur multipliers and universal extensions of group homomorphisms

Abstract

In this note, starting with any group homomorphism f G, which is surjective upon abelianization, we construct a universal central extension u U G, UNDER with the same surjective property, such that for any central extension m M G, under f, there is a unique homomorphism U M with the obvious commutation condition. The kernel of u is the relative Schur multiplier group H2(G,;Z) as defined in the paper. The case where G is perfect corresponds to =1. This yields homological obstructions to lifting solution of equations in G. Upon repetition, for finite groups, this gives a universal hypercentral factorization of the map f G.