D-modules on G-representations

Abstract

We give an answer to the abstract Capelli problem: Let (G, V) be a multiplicity-free finite-dimensional representation of a connected reductive complex Lie group G and G' be its derived subgroup. Assume that the categorical quotient V//G is one dimensional, i.e., there exists a polynomial f generating the algebra of G'-invariant polynomials on V (C[V]G' = C[f]) and that f ∈ C[V]G. We prove that the category of regular holonomic DV-modules invariant under the action of G is equivalent to the category of graded modules of finite type over a suitable algebra A.