A Riemann-Roch Theorem For One-Dimensional Complex Groupoids
Abstract
We consider a smooth groupoid of the form where is a Riemann surface and a discrete pseudogroup acting on by local conformal diffeomorphisms. After defining a K-cycle on the crossed product C0() generalising the classical Dolbeault complex, we compute its Chern character in cyclic cohomology, using the index theorem of Connes and Moscovici. This involves in particular a generalisation of the Euler class constructed from the modular automorphism group of the von Neumann algebra L∞().
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