The third homology of stem-extensions and Whitehead's quadratic functor

Abstract

Let A →tail G Q be a stem-extension and let : A× G G be the multiplication map. We show that there is a natural map : H1(2ε, Tor1Z(2∞A,2∞A)) H3(G,Z)/(A Z H2(G,Z)) such that, the image of coincides with the image of the natural map H3(A,Z) H3(G,Z)/(A Z H2(G,Z)). An important tool used here is Whitehead's quadratic functor . As part of our proof of the main result, we give a precise homological description of the kernel of the natural map (A) Az A, γ(a) a a.