Branching Rules for Koornwinder Polynomials with One Column Diagrams and Matrix Inversions

Abstract

We present an explicit formula for the transition matrix C from the type BCn Koornwinder polynomials P(1r)(x|a,b,c,d|q,t) with one column diagrams, to the type BCn monomial symmetric polynomials m(1r)(x). The entries of the matrix C enjoy a set of four terms recursion relations. These recursions provide us with the branching rules for the Koornwinder polynomials with one column diagrams, namely the restriction rules from BCn to BCn-1. To have a good description of the transition matrices involved, we introduce the following degeneration scheme of the Koornwinder polynomials: P(1r)(x|a,b,c,d|q,t) P(1r)(x|a,-a,c,d|q,t) P(1r)(x|a,-a,c,-c|q,t) P(1r)(x|t1/2c,-t1/2c,c,-c|q,t) P(1r)(x|t1/2,-t1/2,1,-1|q,t). We prove that the transition matrices associated with each of these degeneration steps are given in terms of the matrix inversion formula of Bressoud. As an application, we give an explicit formula for the Kostka polynomials of type Bn, namely the transition matrix from the Schur polynomials P(Bn,Bn)(1r)(x|q;q,q) to the Hall-Littlewood polynomials P(Bn,Bn)(1r)(x|t;0,t). We also present a conjecture for the asymptotically free eigenfunctions of the Bn q-Toda operator, which can be regarded as a branching formula from the Bn q-Toda eigenfunction restricted to the An-1 q-Toda eigenfunctions.