Bogomolov multipliers and retract rationality for semi-direct products

Abstract

Let G be a finite group. The Bogomolov multiplier B0(G) is constructed as an obstruction to the rationality of C(V)G where G GL(V) is a faithful representation over C. We prove that, for any finite groups G1 and G2, B0(G1× G2) B0(G1)× B0(G2) under the restriction map. If G=N G0 with \|N|,|G0|\=1, then B0(G) B0(N)G0× B0(G0) under the restriction map. For any integer n, we show that there are non-direct-product p-groups G1 and G2 such that B0(G1) and B0(G2) contain subgroups isomorphic to (Z/p Z)n and Z/pn Z respectively. On the other hand, if k is an infinite field and G=N G0 where N is an abelian normal subgroup of exponent e satisfying that ζe∈ k, we will prove that, if k(G0) is retract k-rational, then k(G) is also retract k-rational provided that certain "local" conditions are satisfied; this result generalizes two previous results of Saltman and Jambor Ja.