Enumeration of Generalized Dyck Paths Based on the Height of Down-Steps Modulo k

Abstract

For fixed non-negative integers k, t, and n, with t < k, a kt-Dyck path of length (k+1)n is a lattice path that starts at (0, 0), ends at ((k+1)n, 0), stays weakly above the line y = -t, and consists of steps from the step-set \(1, 1), (1, -k)\. We enumerate the family of kt-Dyck paths by considering the number of down-steps at a height of i modulo k. Given a tuple (a1, a2, …, ak) we find an exact enumeration formula for the number of kt-Dyck paths of length (k+1)n with ai down-steps at a height of i modulo k, 1 ≤ i ≤ k. The proofs given are done via bijective means or with generating functions.