On category O for cyclotomic rational Cherednik algebras

Abstract

We study equivalences for category Op of the rational Cherednik algebras Hp of type Gl(n) = μln Sn: a highest weight equivalence between Op and Oσ(p) for σ∈ Sl and an action of Sl on a non-empty Zariski open set of parameters p; a derived equivalence between Op and Op' whenever p and p' have integral difference; a highest weight equivalence between Op and a parabolic category O for the general linear group, under a non-rationality assumption on the parameter p. As a consequence, we confirm special cases of conjectures of Etingof and of Rouquier.