Construction of Sheaves of Cherednik Algebras via Formal Geometry

Abstract

In this note we realize the sheaf of Cherednik algebras H1, c, X, G on a general good complex orbifold X/G, originally introduced by Etingof for smooth complex varieties with an action by a finite group, by gluing sheaves of flat sections of flat holomorphic vector bundles on orbit type strata in X which result from a localization procedure. In the case, when c is formal, this construction can be interpreted as a formal deformation of DX CG via Gel'fand-Kazhdan formal geometry. Contrary to the original definition of H1, c, X, G the presented construction permits the computation of trace densities, Hochschild homologies and an algebraic index theorem for formal deformations of DX CG. We also hope that the methods developed here will contribute towards a full proof of Dolgushev-Etingof's conjecture.