On Semisymmetric Height and a Multidimensional Generalization of Weighted Catalan Numbers

Abstract

Weighted Catalan numbers are a class of weighted sums over Dyck paths. Well-studied for their arithmetic properties and applications to enumerative combinatorics, these numbers were recently generalized to the setting of k-dimensional Catalan numbers for k ≥ 2. In this paper, we introduce the k-dimensional semisymmetric weighted Catalan numbers (k-dimensional SSWCNs), an alternative k-dimensional generalization, along with their variant, the k-dimensional u-bounded semisymmetric weighted Catalan numbers (k-dimensional u-bounded SSWCNs). We define these two classes of numbers using the notion of semisymmetric height, a new statistic on points in Zk≥ 0 motivated by geometric symmetries of k-dimensional analogs of Dyck paths and of the fundamental Weyl chamber of type Ak-1. For our main results, we prove the eventual periodicity of k-dimensional SSWCNs and their u-bounded variants modulo a suitable integer m, and we derive formulas for several classes of k-dimensional u-bounded SSWCNs. Additionally, using semisymmetric height, we derive novel analogs in the k-dimensional setting of the integer sequence counting Dyck paths by height and of the Narayana numbers. We conclude the paper with a future direction for generalizing weighted Catalan numbers to the k-dimensional setting.