Polyhedral geometry of refined q,t-Catalan numbers

Abstract

We study a refinement of the q,t-Catalan numbers introduced by Xin and Zhang (2022, 2023) using tools from polyhedral geometry. These refined q,t-Catalan numbers depend on a vector of parameters k and the classical q,t-Catalan numbers are recovered when k = (1,…,1). We interpret Xin and Zhang's generating functions by developing polyhedral cones arising from constraints on k-Dyck paths and their associated area and bounce statistics. Through this polyhedral approach, we recover Xin and Zhang's theorem on q,t-symmetry of the refined q,t-Catalan numbers in the cases where k = (k1,k2,k3) and (k,k,k,k), give some extensions, including the case k = (k,k+m,k+m,k+m), and discuss relationships to other generalizations of the q,t-Catalan numbers.

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