The Equivariant Brauer Group of a Cocommutative Hopf Algebra

Previously we obtained a Picard᎐Brauer five term exact sequence for a symmetric monoidal functor between closed categories. Here we construct the corresponding sequence using the closed category of H-modules for a cocommutative Hopf algebra H.

We show that the Brauer group BM(k, H ν , R s,β ) of the quasitriangular Hopf algebra (H ν , R s,β ) is a direct product of the additive group of the field k and the classical Brauer group B θ s (k, Z 2ν ) associated to the bicharacter θ s on Z 2ν defined by θ s (x, y) = ω sxy , with ω a 2νth root o

Suppose that (G, T ) is a second countable locally compact transformation group given by a homomorphism l: G Ä Homeo(T ), and that A is a separable continuous-trace C\*-algebra with spectrum T. An action :: G Ä Aut(A) is said to cover l if the induced action of G on T coincides with the original one

In the context of finite-dimensional cocommutative Hopf algebras, we prove versions of various group cohomology results: the Quillen᎐Venkov theorem on detecting nilpotence in group cohomology, Chouinard's theorem on determining whether a kG-module is projective by restricting to elementary abelian p