Non abelian tensor square of non abelian prime power groups

Abstract

For every p-group of order pn with the derived subgroup of order pm, Rocco in roc has shown that the order of tensor square of G is at most pn(n-m). In the present paper not only we improve his bound for non-abelian p-groups but also we describe the structure of all non-abelian p-groups when the bound is attained for a special case. Moreover, our results give as well an upper bound for the order of π3(SK(G, 1)).