The Dunkl Weight Function for Rational Cherednik Algebras
Abstract
In this paper we prove the existence of the Dunkl weight function for any irreducible representation of any finite Coxeter group , generalizing previous results of Dunkl. In particular, is a family of tempered distributions on the real reflection representation of taking values in , with holomorphic dependence on the complex multi-parameter . When the parameter is real, the distribution provides an integral formula for Cherednik's Gaussian inner product on the Verma module for the rational Cherednik algebra . In this case, the restriction of to the hyperplane arrangement complement is given by integration against an analytic function whose values can be interpreted as braid group invariant Hermitian forms on , where denotes the Knizhnik-Zamolodchikov functor introduced by Ginzburg-Guay-Opdam-Rouquier. This provides a concrete connection between invariant Hermitian forms on representations of rational Cherednik algebras and invariant Hermitian forms on representations of Iwahori-Hecke algebras, and we exploit this connection to show that the functor preserves signatures, and in particular unitarizability, in an appropriate sense.
Cite
@article{arxiv.1803.00440,
title = {The Dunkl Weight Function for Rational Cherednik Algebras},
author = {Seth Shelley-Abrahamson},
journal= {arXiv preprint arXiv:1803.00440},
year = {2018}
}
Comments
52 pages