Intermediate Macdonald Polynomials and Their Vector Versions

Abstract

Intermediate Macdonald polynomials for an affine root system S with fixed origin and finite Weyl group W0 are orthogonal polynomials invariant under a parabolic subgroup WJ W0. The extreme cases of WJ=1 and WJ=W0 correspond to the non-symmetric and symmetric Macdonald polynomials, respectively. In this paper, we use double-affine Hecke algebras to study their basic properties, including that they form an orthogonal basis and that they diagonalise a commutative algebra of difference-reflection operators, and calculate their norms. Finally, we provide two interpretations of intermediate Macdonald polynomials as vector-valued polynomials and connect them to the literature.