Quadratic Capelli operators and Okounkov polynomials

Abstract

Let Z be the symmetric cone of r × r positive definite Hermitian matrices over a real division algebra F. Then Z admits a natural family of invariant differential operators -- the Capelli operators Cλ -- indexed by partitions λ of length at most r, whose eigenvalues are given by specialization of Knop--Sahi interpolation polynomials. In this paper we consider a double fibration Y X Z where Y is the Grassmanian of r-dimensional subspaces of Fn with n ≥ 2r. Using this we construct a family of invariant differential operators Dλ,s on Y that we refer to as quadratic Capelli operators. Our main result shows that the eigenvalues of the Dλ,s are given by specializations of Okounkov interpolation polynomials.