A Combinatorial Approach to the Symmetry of q,t-Catalan Numbers

Abstract

The q,t-Catalan numbers Cn(q,t) are polynomials in q and t that reduce to the ordinary Catalan numbers when q=t=1. These polynomials have important connections to representation theory, algebraic geometry, and symmetric functions. Haglund and Haiman discovered combinatorial formulas for Cn(q,t) as weighted sums of Dyck paths (or equivalently, integer partitions contained in a staircase shape). This paper undertakes a combinatorial investigation of the joint symmetry property Cn(q,t)=Cn(t,q). We conjecture some structural decompositions of Dyck objects into "mutually opposite" subcollections that lead to a bijective explanation of joint symmetry in certain cases. A key new idea is the construction of infinite chains of partitions that are independent of n but induce the joint symmetry for all n simultaneously. Using these methods, we prove combinatorially that for 0≤ k≤ 9 and all n, the terms in Cn(q,t) of total degree n2-k have the required symmetry property.