Commutativity of invariant differential operators on vector bundles on Hermitian symmetric spaces

Abstract

Let G/K be a Hermitian symmetric space and Vτ an irreducible representation of K. We study the ring DG(G/K, Vτ) of G-invariant differential operators on sections of vector bundles G×(K, τ) Vτ over G/K defined by a finite-dimensional representation (Vτ, τ) of K. We classify irreducible representations (Vτ, τ) such that DG(G/K, Vτ) is commutative. We construct eigenfunctions for the differential operators and study the invariance property of the eigenvalues under the Weyl group for the restricted real root system of G.