Quantization, orbifold cohomology, and Cherednik algebras
Abstract
We compute the Hochschild homology of the crossed product C[Sn] A n in terms of the Hochschild homology of the associative algebra A (over C). It allows us to compute the Hochschild (co)homology of C[W] A n where A is the q-Weyl algebra or any its degeneration and W is the Weyl group of type An-1 or Bn. For a deformation quantization A+ of an affine symplectic variety X we show that the Hochschild homology of Sn A, A=A+[-1] is additively isomorphic to the Chen-Ruan orbifold cohomology of SnX with coefficients in C(()). We prove that for X satisfying H1(X, C)=0 (or A∈ VB(d)) the deformation of SnX ( C[Sn] A n) which does not come from deformations of X (A) exists if and only if X=2 (d=2). In particular if A is q-Weyl algebra (its trigonometric or rational degeneration) then the corresponding nontrivial deformations yield the double affine Hecke algebras of type An-1 (its trigonometric or rational versions) introduced by Cherednik.
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