Double affine Hecke algebras and Calogero-Moser spaces

Abstract

In this paper we prove that the spherical subalgebra eH1,τe of the double affine Hecke algebra H1,τ is an integral Cohen-Macaulay algebra isomorphic to the center Z of H1,τ, and H1,τe is a Cohen-Macaulay eH1,τe-module with the property H1,τ=EndeH1,τe(H1,τe). In the case of the root system An-1 the variety Spec(Z) is smooth and coincides with the completion of the configuration space of the relativistic analog of the trigomonetric Calogero-Moser system. This implies the result of Cherednik that the module eH1,τ is projective and all irreducible finite dimensional representations of H1,τ are regular representation of the finite Hecke algebra.

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