One-step spherical functions of the pair (SU(n+1),U(n))

Abstract

The aim of this paper is to determine all irreducible spherical functions of the pair (G,K)=(SU(n+1),U(n)), where the highest weight of their K-types are of the form (m+l,...,m+l,m,...,m). Instead of looking at a spherical function of type π we look at a matrix-valued function H defined on a section of the K-orbits in an affine subvariety of Pn(C). The function H diagonalizes, hence it can be identified with a column vector-valued function. The irreducible spherical functions of type π turn out to be parameterized by S=(w,r)∈ Z x Z : 0≤ w, 0 ≤ r ≤ l, 0≤ m+w+r. A key result to characterize the associated function Hw,r is the existence of a matrix-valued polynomial function of degree l such that Fw,r(t)=(t)-1Hw,r(t) becomes an eigenfunction of a matrix hypergeometric operator with eigenvalue λ(w,r), explicitly given. In the last section we assume that m 0 and define the matrix polynomial Pw as the (l+1) x (l+1) matrix whose r-row is the polynomial Fw,r. This leads to interesting families of matrix-valued orthogonal Jacobi polynomials Pwα,β for α,β>-1.