The order of the non-abelian tensor product of groups

Abstract

Let G and H be groups that act compatibly on each other. We denote by [G,H] the derivative subgroup of G under H. We prove that if the set \g-1gh g ∈ G, h ∈ H\ has m elements, then the derivative [G,H] is finite with m-bounded order. Moreover, we show that if the set of all tensors T(G,H) = \g h g ∈ G, h∈ H\ has m elements, then the non-abelian tensor product G H is finite with m-bounded order. We also examine some finiteness conditions for the non-abelian tensor square of groups.