On the torsion in a group F/[M,N] in the case of combinatorial asphericity of groups F/M and F/N

Abstract

Let F be a non-Abelian free group with basis A, M and N be the normal closures of sets RM and RN of words in the alphabet A 1. As is known, the group F/[N, N] is torsion-free, but, in general, torsion in F/[M, N] is possible. In the paper of Hartley and Kuz'min (1991), it was proved that if RM=\v\, RN=\w\ and words v and w are not a proper power in F, then F/[M,N] is torsion-free. In the present paper a sufficient condition for the absence of torsion in F/[M,N] is obtained, which allows to generalize the result of Hartley and Kuz'min to arbitrary words v and w.