We consider a smooth groupoid of the form \Sigma\rtimes\Gamma where \Sigma is a Riemann surface and \Gamma a discrete pseudogroup acting on \Sigma by local conformal diffeomorphisms. After defining a K-cycle on the crossed product C_0(\Sigma)\rtimes\Gamma 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^{\infty}(\Sigma)\rtimes\Gamma.

Publié le : 2001-07-05
Classification:  [MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph],  [MATH.MATH-DG]Mathematics [math]/Differential Geometry [math.DG],  [PHYS.HTHE]Physics [physics]/High Energy Physics - Theory [hep-th]

@article{hal-00130378,
     author = {Perrot, Denis},
     title = {A Riemann-Roch Theorem For One-Dimensional Complex Groupoids},
     journal = {HAL},
     volume = {2001},
     number = {0},
     year = {2001},
     language = {en},
     url = {http://dml.mathdoc.fr/item/hal-00130378}
}

Perrot, Denis. A Riemann-Roch Theorem For One-Dimensional Complex Groupoids. HAL, Tome 2001 (2001) no. 0, . http://gdmltest.u-ga.fr/item/hal-00130378/