Cuspidal representations of rational Cherednik algebras at t=0
arXiv:0911.0069
Abstract
We study those finite dimensional quotients of the rational Cherednik algebra at t=0 that are supported at a point of the centre. It is shown that each such quotient is Morita equivalent to a certain cuspidal quotient of a rational Cherednik algebra associated to a parabolic subgroup of W.
Comments welcome