Reducing submodules of Hilbert Modules and Chevalley-Shephard-Todd Theorem

Abstract

Let G be a finite pseudoreflection group, ⊂eq Cn be a bounded domain which is a G-space and H⊂eq O() be an analytic Hilbert module possessing a G-invariant reproducing kernel. We study the structure of joint reducing subspaces of the multiplication operator Mθ on H, where \θi\i=1n is a homogeneous system of parameters associated to G and θ = (θ1, …, θn) is a polynomial map of Cn. We show that it admits a family \ P H:∈ G\ of non-trivial joint reducing subspaces, where G is the set of all equivalence classes of irreducible representations of G. We prove a generalization of Chevalley-Shephard-Todd theorem for the algebra O() of holomorphic functions on . As a consequence, we show that for each ∈ G, the multiplication operator Mθ on the reducing subspace P H can be realized as multiplication by the coordinate functions on a reproducing kernel Hilbert space of C(deg\,)2-valued holomorphic functions on θ(). This, in turn, provides a description of the structure of joint reducing subspaces of the multiplication operator induced by a representative of a proper holomorphic map from a domain in Cn which is factored by automorphisms G⊂eq Aut().