Bogomolov multipliers for some p-groups of nilpotency class 2

Abstract

The Bogomolov multiplier B0(G) of a finite group G is defined as the subgroup of the Schur multiplier consisting of the cohomology classes vanishing after restriction to all abelian subgroups of G. The triviality of the Bogomolov multiplier is an obstruction to Noether's problem. We show that if G is a central product of G1 and G2, regarding Ki≤ Z(Gi), i=1,2, and θ:G1 G2 is a group homomorphism such that its restriction θK1:K1 K2 is an isomorphism, then the triviality of B0(G1/K1), B0(G1) and B0(G2) implies the triviality of B0(G). We give a positive answer to Noether's problem for all 2-generator p-groups of nilpotency class 2, and for one series of 4-generator p-groups of nilpotency class 2 (with the usual requirement for the roots of unity).