Some limit transitions between BC type orthogonal polynomials interpreted on quantum complex Grassmannians

Abstract

The quantum complex Grassmannian Uq/Kq of rank l is the quotient of the quantum unitary group Uq=Uq(n) by the quantum subgroup Kq=Uq(n-l)xUq(l). We show that (Uq,Kq) is a quantum Gelfand pair and we express the zonal spherical functions, i.e. Kq-biinvariant matrix coefficients of finite- dimensional irreducible representations of Uq, as multivariable little q-Jacobi polynomials depending on one discrete parameter. Another type of biinvariant matrix coefficients is identified as multivariable big q-Jacobi polynomials. The proof is based on earlier results by Noumi, Sugitani and the first author relating Koornwinder polynomials to a one-parameter family of quantum complex Grassmannians, and certain limit transitions from Koornwinder polynomials to multivariable big and little q-Jacobi polynomials studied by Koornwinder and the second author.

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