Invariant differential operators and the generalized symmetric group

Abstract

In this paper we study the decomposition of the direct image of π+(X) the polynomial ring X as a -module, under the map π: X XG(r,n), where XG(r,n) is the ring of invariant polynomial under the action of the wreath product G(r,p):= / r n . We first describe the generators of the simple components of π+(X) and give their multiplicities. Using an equivalence of categories and the higher Specht polynomials, we describe a -module decomposition of the polynomial ring localized at the discriminant of π. Furthermore, we study the action invariants, differential operators, on the higher Specht polynomials.