An exact sequence and triviality of Bogomolov multiplier of groups

Abstract

The Bogomolov multiplier B0(G) of a finite group G is the subgroup of the Schur multiplier H2(G, Q/ Z) consisting of the cohomology classes which vanish after restricting to every abelian subgroup of G. We give a new proof of a Hopf-type formula for B0(G) and derive an exact sequence for the cohomological version of the Bogomolov multiplier. Using this exact sequence we provide necessary and sufficient conditions for the corresponding inflation homomorphism to be an epimorphism and to be the zero map. Finally, we give a complete list of groups of order p6, for odd prime p, having trivial Bogomolov multiplier, so completing the 2020 investigation of Chen and Ma.