Weighted Dyck paths and nonstationary queues

Open Webpage

Gianmarco Bet, Jori Selen, Alessandro Zocca

Published: 08 Jan 2022, Last Modified: 25 Jan 2026Stochastic ModelsEveryoneRevisionsBibTeXCC BY-SA 4.0
Abstract: <p>We consider a model for a queue in which only a fixed number N of customers can join. Each customer joins the queue independently at an exponentially distributed time. Assuming further that the service times are independent and follow an exponential distribution, this system can be described as a two-dimensional Markov chain on a finite triangular region (Formula presented.) of the square lattice. We interpret the resulting random walk on (Formula presented.) as a Dyck path that is weighted according to some state-dependent transition probabilities that are constant along one axis, but are rather general otherwise. We untangle the resulting intricate combinatorial structure by introducing appropriate generating functions that exploit the recursive structure of the model. This allows us to derive an explicit expression for the probability mass function of the number of customers served in any busy period (equivalently, of the length of any excursion of the Dyck path above the diagonal) as a weighted sum with alternating sign over a certain subclass of Dyck paths.</p>