Invariant differential operators on spherical homogeneous spaces with overgroups

Abstract

We investigate the structure of the ring DG(X) of G-invariant differential operators on a reductive spherical homogeneous space X=G/H with an overgroup G. We consider three natural subalgebras of DG(X) which are polynomial algebras with explicit generators, namely the subalgebra DG(X) of G-invariant differential operators on X and two other subalgebras coming from the centers of the enveloping algebras of g and k, where K is a maximal proper subgroup of G containing H. We show that in most cases DG(X) is generated by any two of these three subalgebras, and analyze when this may fail. Moreover, we find explicit relations among the generators for each possible triple (G,G,H), and describe "transfer maps" connecting eigenvalues for DG(X) and for the center Z( g C) of the enveloping algebra of g C.