Dirac induction for rational Cherednik algebras

Abstract

We introduce the local and global indices of Dirac operators for the rational Cherednik algebra Ht,c(G,h), where G is a complex reflection group acting on a finite-dimensional vector space h. We investigate precise relations between the (local) Dirac index of a simple module in the category O of Ht,c(G,h), the graded G-character of the module, the Euler-Poincar\'e pairing, and the composition series polynomials for standard modules. In the global theory, we introduce integral-reflection modules for Ht,c(G,h) constructed from finite-dimensional G-modules. We define and compute the index of a Dirac operator on the integral-reflection module and show that the index is, in a sense, independent of the parameter function c. The study of the kernel of these global Dirac operators leads naturally to a notion of dualised generalised Dunkl-Opdam operators.