Equivariant higher Dixmier-Douady Theory for circle actions on UHF-algebras

Abstract

We develop an equivariant Dixmier-Douady theory for locally trivial bundles of C*-algebras with fibre D K equipped with a fibrewise T-action, where T denotes the circle group and D = End(V) ∞ for a T-representation V. In particular, we show that the group of T-equivariant *-automorphisms AutT(D K) is an infinite loop space giving rise to a cohomology theory E*D,T(X). Isomorphism classes of equivariant bundles then form a group with respect to the fibrewise tensor product that is isomorphic to E1D,T(X) [X, BAutT(D K)]. We compute this group for tori and compare the case D = C to the equivariant Brauer group for trivial actions on the base space.