Decomposition of modules over invariant differential operators

Abstract

Let G be a finite subgroup of the linear group of a finite-dimensional complex vector V, B= S(V) be the symmetric algebra, D= DGB the ring of G-invariant differential operators, and D- its subring of negative degree operators. We prove that M Mann= Ann D-(M) defines an isomorphism between the category of D-submodules of B and a category of modules formed as lowest weight spaces. This is applied to a construction of simple D-submodules of B when G is a generalized symmetric group, to show that Bann is a so-called Gelfand model. Using differential algebra and lowest weight methods we also prove branching rules, entailing the main results in the representation theory of the symmetric group, such as a differential construction of the Young basis.