The Capelli identity and Radon transform for Grassmannians

Abstract

We study a family Cs,l of Capelli-type invariant differential operators on the space of rectangular matrices over a real division algebra. The Cs,l descend to invariant differential operators on the corresponding Grassmannian, which is a compact symmetric space, and we determine the image of the Cs,l under the Harish-Chandra homomorphism. We also obtain analogous results for corresponding operators on the non-compact duals of the Grassmannians, and for line bundles. As an application we obtain a Radon inversion formula, which generalizes a recent result of B. Rubin for real Grassmannians.