Asymptotic normality arising in Baxter permutations
Abstract
Baxter permutations arose in the study of fixed points of the composite of commuting functions by Glen Baxter in 1964. This type of permutations are counted by Baxter numbers . It turns out that enumerate a lot of discrete objects such as the bases for subalgebras of the Malvenuto-Reutenauer Hopf algebra, the pairs of twin binary trees on nodes, or the diagonal rectangulations of an grid. The refined Baxter number also count many interesting objects including the Baxter permutations of with descents and rises, twin pairs of binary trees with left leaves and right leaves, or plane bipolar orientations with faces and vertices. In this paper, we obtain the asymptotic normality of the refined Baxter number by using a sufficient condition due to Bender. In the course of our proof, the computation involving and some related numbers is crucial, while has no closed form which make the computation untractable. To address this problem, we employ the method of asymptotics of the solutions of linear recurrence equations. Our proof is semi-automatic. All the asymptotic expansions and recurrence relations are proved by utilizing symbolic computation packages.
Cite
@article{arxiv.2410.05031,
title = {Asymptotic normality arising in Baxter permutations},
author = {James Jing Yu Zhao},
journal= {arXiv preprint arXiv:2410.05031},
year = {2024}
}
Comments
14 pages