Non-abelian tensor product of residually finite groups

Abstract

Let G and H be groups that act compatibly on each other. We denote by η(G,H) a certain extension of the non-abelian tensor product G H by G × H. Suppose that G is residually finite and the subgroup [G,H] = g-1gh \ g ∈ G, h∈ H satisfies some non-trivial identity f ~1. We prove that if p is a prime and every tensor has p-power order, then the non-abelian tensor product G H is locally finite. Further, we show that if n is a positive integer and every tensor is left n-Engel in η(G,H), then the non-abelian tensor product G H is locally nilpotent. The content of this paper extend some results concerning the non-abelian tensor square G G.