Non-abelian tensor square and related constructions of p-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 finite potent p-group, then [G,G] and the k-th term of the lower central series γk((G)) are potently embedded in (G) (Theorem A). Moreover, we show that if G is a potent p-group, then the exponent ((G)) divides p · (G) (Theorem B). We also study the weak commutativity construction of powerful p-groups (Theorem C).
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