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

Nistor, Victor; Troitsky, Evgenij

doi:10.1090/S0002-9947-03-03370-1

An index for gauge-invariant operators and the Dixmier-Douady invariant
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by Victor Nistor and Evgenij Troitsky PDF

Trans. Amer. Math. Soc. 356 (2004), 185-218 Request permission

Abstract:

Let $\mathcal {G}\to B$ be a bundle of compact Lie groups acting on a fiber bundle $Y \to B$. In this paper we introduce and study gauge-equivariant $K$-theory groups $K_\mathcal {G}^i(Y)$. 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 $\mathcal {G}\to B$. As an application, we define a gauge-equivariant index for a family of elliptic operators $(P_b)_{b \in B}$ invariant with respect to the action of $\mathcal {G}\to B$, which, in this approach, is an element of $K_\mathcal {G}^0(B)$. We then give another definition of the gauge-equivariant index as an element of $K_0(C^*(\mathcal {G}))$, the $K$-theory group of the Banach algebra $C^*(\mathcal {G})$. We prove that $K_0(C^*(\mathcal {G})) \simeq K^0_\mathcal {G}(\mathcal {G})$ and that the two definitions of the gauge-equivariant index are equivalent. The algebra $C^*(\mathcal {G})$ 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 turned out to be useful in the study of Ramond–Ramond fields.

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