Equivariant Index Theorem on Rn in the Context of Continuous Fields of C*-algebras
Abstract
We prove an equivariant index theorem on the Euclidean space using a continuous field of C*-algebras. This generalizes the work of Elliott, Natsume and Nest, which is a special case of the algebraic index theorem by Nest-Tsygan. Using our formula, the equivariant index of the Bott-Dirac operator on R2n can be explicitly calculated.
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