m-Symmetric functions, non-symmetric Macdonald polynomials and positivity conjectures

Abstract

We study the space, Rm, of m-symmetric functions consisting of polynomials that are symmetric in the variables xm+1,xm+2,xm+3,… but have no special symmetry in the variables x1,…,xm. We obtain m-symmetric Macdonald polynomials by t-symmetrizing non-symmetric Macdonald polynomials, and show that they form a basis of Rm. We define m-symmetric Schur functions through a somewhat complicated process involving their dual basis, tableaux combinatorics, and the Hecke algebra generators, and then prove some of their most elementary properties. We conjecture that the m-symmetric Macdonald polynomials (suitably normalized and plethystically modified) expand positively in terms of m-symmetric Schur functions. We obtain relations on the (q,t)-Koska coefficients K (q,t) in the m-symmetric world, and show in particular that the usual (q,t)-Koska coefficients are special cases of the K (q,t)'s. Finally, we show that when m is large, the positivity conjecture, modulo a certain subspace, becomes a positivity conjecture on the expansion of non-symmetric Macdonald polynomials in terms of non-symmetric Hall-Littlewood polynomials.