Composition schemes: q-enumerations and phase transitions
Abstract
Composition schemes are ubiquitous in combinatorics, statistical mechanics and probability theory. We give a unifying explanation to various phenomena observed in the combinatorial and statistical physics literature in the context of~-enumeration (this is a model where objects with a parameter of value have a Gibbs measure/Boltzmann weight ). For structures enumerated by a composition scheme, we prove a phase transition for any parameter having such a Gibbs measure: for a critical value , the limit law of the parameter is a two-parameter Mittag-Leffler distribution, while it is Gaussian in the supercritical regime (), and it is a Boltzmann distribution in the subcritical regime (). We apply our results to fundamental statistics of lattice paths and quarter-plane walks. We also explain previously observed limit laws for pattern-restricted permutations, and a phenomenon uncovered by Krattenthaler for the wall contacts in watermelons.
Keywords
Cite
@article{arxiv.2311.17226,
title = {Composition schemes: q-enumerations and phase transitions},
author = {Cyril Banderier and Markus Kuba and Stephan Wagner and Michael Wallner},
journal= {arXiv preprint arXiv:2311.17226},
year = {2024}
}
Comments
18 pages, appeared in the proceedings of the 35th International Conference on Probabilistic, Combinatorial and Asymptotic Methods for the Analysis of Algorithms (AofA 2024)