Hajime Fujita, Mikio Furuta, Takahiko Yoshida
Published 2009-10-02, updated 2014-02-03Version 4
We give a framework of localization for the index of a Dirac-type operator on an open manifold. Suppose the open manifold has a compact subset whose complement is covered by a family of finitely many open subsets, each of which has a structure of the total space of a torus bundle. Under an acyclic condition we define the index of the Dirac-type operator by using the Witten-type deformation, and show that the index has several properties, such as excision property and a product formula. In particular, we show that the index is localized on the compact set.
Comments: 47 pages, 2 figures. To appear in Communications in Mathematical Physics
Journal: Comm. Math. Phys. 326 (2014), no. 3, 585-633
Torus fibrations and localization of index III
Boundedness of certain automorphism groups of an open manifold
Lie Groups of Fourier Integral Operators on Open Manifolds
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