Wright, Nick (2003) Co coarse geometry and scalar curvature. Journal of Functional Analysis, 197 (2), 469-488. (doi:10.1016/S0022-1236(02)00025-3).
Abstract
In this paper we introduce an alternative form of coarse geometry on proper metric spaces, which is more delicate at infinity than the standard metric coarse structure. There is an assembly map from the K-homology of a space to the K-theory of the C*-algebra associated to the new coarse structure, which factors through the coarse K-homology of the space (with the new coarse structure).
A Dirac-type operator on a complete Riemannian manifold M gives rise to a class in K-homology, and its image under assembly gives a higher index in the K-theory group. The main result of this paper is a vanishing theorem for the index of the Dirac operator on an open spin manifold for which the scalar curvature ?(x) tends to infinity as x tends to infinity. This is derived from a spectral vanishing theorem for any Dirac-type operator with discrete spectrum and finite dimensional eigenspaces.
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