Bogomolov multipliers of p-groups of maximal class

Abstract

Let G be a p-group of maximal class and order pn. We determine whether or not the Bogomolov multiplier B0(G) is trivial in terms of the lower central series of G and P1 = CG(γ2(G) / γ4(G)). If in addition G has positive degree of commutativity and P1 is metabelian, we show how understanding B0(G) reduces to the simpler commutator structure of P1. This result covers all p-groups of maximal class of large enough order and, furthermore, it allows us to give the first natural family of p-groups containing an abundance of groups with nontrivial Bogomolov multipliers. We also provide more general results on Bogomolov multipliers of p-groups of arbitrary coclass r.