Decomposition of the polynomials over the spherical subalgebra

Abstract

Given a finite subgroup W ⊂ () of the linear group of a finite-dimensional complex vector field , it is a well-studied problem to describe the structure of the symmetric algebra B= (*) as a representation of G, and also as a module over the ring of invariant differential operators under W in the ring () of differential operators on . Since the rational Cherednik algebra Hc(W,) and the spherical algebra eHce are respectively universal deformations of the ring () and the ring ()Wof W-invariant differential operators, we would like to build an analogy between the decomposition of modules over the invariant differential operators in Nonk1, Nonk2, Nonk3 and the decomposition of modules over the sperical subalgebra of the rational Cherednik algebra. The ring c= eHce inherits the natural grading of B, and we let c0 ⊂ c and c- ⊂ c be subset of elements of degree 0 end strictly negative degree, respectively. Our main result is that there is for all finite reflection groups a lowest weight description of the category of c-modules of B where the ring c= c0 / c0 c c- plays the very important role of Cartan algebra.