Recollement of Deformed Preprojective Algebras and the Calogero-Moser Correspondence

Abstract

The aim of this paper is to clarify the relation between the following objects: (a) rank 1 projective modules (ideals) over the first Weyl algebra A1(); (b) simple modules over deformed preprojective algebras λ(Q) introduced by Crawley-Boevey and Holland; and (c) simple modules over the rational Cherednik algebras H0,c(Sn) associated to symmetric groups. The isomorphism classes of each type of these objects can be parametrized geometrically by the same space (namely, the Calogero-Moser algebraic varieties); however, no natural functors between the corresponding module categories seem to be known. We construct such functors by translating our earlier results on -modules over A1 to a more familiar setting of representation theory. In the last section we extend our construction to the case of Kleinian singularities 2/ , where is a finite cyclic subgroup of (2, ) .