An index for gauge-invariant operators and the Dixmier-Douady invariant

Abstract

Let B be a bundle of compact Lie groups acting on a fiber bundle Y B. In this paper we introduce and study gauge-equivariant K-theory groups Ki(Y). These groups satisfy the usual properties of the equivariant K-theory groups, but also some new phenomena arise due to the topological non-triviality of the bundle B. As an application, we define a gauge-equivariant index for a family of elliptic operators (Pb)b ∈ B invariant with respect to the action of B, which, in this approach, is an element of K0(B). We then give another definition of the gauge-equivariant index as an element of K0(C*()), the K-theory group of the Banach algebra C*(). We prove that K0(C*()) K0() and that the two definitions of the gauge-equivariant index are equivalent. The algebra C*() is the algebra of continuous sections of a certain field of C*-algebras with non-trivial Dixmier-Douady invariant. The gauge-equivariant K-theory groups are thus examples of twisted K-theory groups, which have recently proved themselves useful in the study of Ramond-Ramond fields.

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