Combinatorics of certain higher q,t-Catalan polynomials: chains, joint symmetry, and the Garsia-Haiman formula

Abstract

The higher q,t-Catalan polynomial C(m)n(q,t) can be defined combinatorially as a weighted sum of lattice paths contained in certain triangles, or algebraically as a complicated sum of rational functions indexed by partitions of n. This paper proves the equivalence of the two definitions for all m≥ 1 and all n≤ 4. We also give a bijective proof of the joint symmetry property C(m)n(q,t)=C(m)n(t,q) for all m≥ 1 and all n≤ 4. The proof is based on a general approach for proving joint symmetry that dissects a collection of objects into chains, and then passes from a joint symmetry property of initial points and terminal points to joint symmetry of the full set of objects. Further consequences include unimodality results and specific formulas for the coefficients in C(m)n(q,t) for all m≥ 1 and all n≤ 4. We give analogous results for certain rational-slope q,t-Catalan polynomials.