k-Schur expansions of Catalan functions

Abstract

We make a broad conjecture about the k-Schur positivity of Catalan functions, symmetric functions which generalize the (parabolic) Hall-Littlewood polynomials. We resolve the conjecture with positive combinatorial formulas in cases which address the k-Schur expansion of (1) Hall-Littlewood polynomials, proving the q=0 case of the strengthened Macdonald positivity conjecture of Lapointe, Lascoux, and Morse; (2) the product of a Schur function and a k-Schur function when the indexing partitions concatenate to a partition, describing a class of Gromov-Witten invariants for the quantum cohomology of complete flag varieties; (3) k-split polynomials, proving a substantial case of a problem of Broer and Shimozono-Weyman on parabolic Hall-Littlewood polynomials. In addition, we prove the conjecture that k-Schur functions defined in terms of k-split polynomials agree with strong tableau k-Schur functions.