Macdonald Polynomials of Type Cn with One-Column Diagrams and Deformed Catalan Numbers

Abstract

We present an explicit formula for the transition matrix C from the type Cn degeneration of the Koornwinder polynomials P(1r)(x\,|\,a,-a,c,-c\,|\,q,t) with one column diagrams, to the type Cn monomial symmetric polynomials m(1r)(x). The entries of the matrix C enjoy a set of three term recursion relations, which can be regarded as a (a,c,t)-deformation of the one for the Catalan triangle or ballot numbers. Some transition matrices are studied associated with the type (Cn,Cn) Macdonald polynomials P(Cn,Cn)(1r)(x\,|\,b;q,t)= P(1r)(x\,|\,b1/2,-b1/2,q1/2b1/2,-q1/2b1/2\,|\,q,t). It is also shown that the q-ballot numbers appear as the Kostka polynomials, namely in the transition matrix from the Schur polynomials P(Cn,Cn)(1r)(x\,|\,q;q,q) to the Hall-Littlewood polynomials P(Cn,Cn)(1r)(x\,|\,t;0,t).