Homotopy theory and generalized dimension subgroups

Abstract

Let G be a group and R,S,T its normal subgroups. There is a natural extension of the concept of commutator subgroup for the case of three subgroups \|R,S,T\| as well as the natural extension of the symmetric product \| r, s, t\| for corresponding ideals r, s, t in the integral group ring Z[G]. In this paper, it is shown that the generalized dimension subgroup G (1+\| r, s, t\|) has exponent 2 modulo \|R,S,T\|. The proof essentially uses homotopy theory. The considered generalized dimension quotient of exponent 2 is identified with a subgroup of the kernel of the Hurewicz homomorphism for the loop space over a homotopy colimit of classifying spaces.