A note on finiteness conditions for the non-abelian tensor square of groups

Abstract

Let G be a group. We denote by (G) a certain extension of the non-abelian tensor square G G by G × G. We prove that if G is a finitely generated group in which the set of all simple tensors T(G) is finite, then the non-abelian tensor square G G and the group (G) are finite. Moreover, we show that if G is a locally residually finite group in which the set of simple tensors T(H) is finite for every proper finitely generated subgroup H of G, then the group (G) is locally finite.