On the Schur multiplier of p-groups with abelianization s-elementary abelian

Abstract

Let p be an odd prime. We describe a method to compute the Schur multiplier of finite p-groups G of nilpotency class 2 such that G/[G,G] is isomorphic to direct product of copies of Zps for s ∈ N, generalizing a method of Blackburn and Evens, who treated the case s=1. As an application, we investigate which abelian p-groups can occur as the Schur multiplier of a non-abelian p-group. We further introduce the notions of s-special p-groups of rank k generalizing the notion of special p-groups of rank k. We study the structural properties, compute the Schur multipliers of s-special p-groups of rank 1.