Random Subwords and Billiard Walks in Affine Weyl Groups

TL;DR

This paper studies the asymptotic behavior of random subwords in affine Weyl groups and models their geometric interpretation as billiard trajectories, revealing a normal distribution pattern and providing formulas for expected Coxeter lengths.

Contribution

It introduces a novel probabilistic model for subwords in affine Weyl groups and derives explicit formulas for their asymptotic distributions and expected lengths.

Findings

Asymptotic distribution of elements is a multivariate normal.

Derived a simple formula for variance depending on subword structure.

Provided an explicit asymptotic formula for expected Coxeter length.

Abstract

Let $W$ be an irreducible affine Weyl group, and let $\mathsf{b}$ be a finite word over the alphabet of simple reflections of $W$. Fix a probability $p\in(0,1)$. For each integer $K\geq 0$, let $\mathsf{sub}_p(\mathsf{b}^K)$ be the random subword of $\mathsf{b}^K$ obtained by deleting each letter independently with probability $1-p$. Let $v_p(\mathsf{b}^K)$ be the element of $W$ represented by $\mathsf{sub}_p(\mathsf{b}^K)$. One can view $v_p(\mathsf{b}^K)$ geometrically as a random alcove; in many cases, this alcove can be seen as the location after a certain amount of time of a random billiard trajectory that, upon hitting a hyperplane in the Coxeter arrangement of $W$, reflects off of the hyperplane with probability $1-p$. We show that the asymptotic distribution of $v_p(\mathsf{b}^K)$ is a central spherical multivariate normal distribution with some variance $\sigma_{\mathsf{b}}^2$ depending on $\mathsf{b}$ and $p$. We provide a formula to compute $\sigma_{\mathsf{b}}^2$ that is remarkably simple when $\mathsf{b}$ contains only one occurrence of the simple reflection that is not in the associated finite Weyl group. As a corollary, we provide an asymptotic formula for $\mathbb{E}[\ell(v_p(\mathsf{b}^K))]$, the expected Coxeter length of $v_p(\mathsf{b}^K)$. For example, when $W=\widetilde A_{r}$ and $\mathsf{b}$ contains each simple reflection exactly once, we find that \[\lim_{K\to\infty}\frac{1}{\sqrt{K}}\mathbb{E}[\ell(v_p(\mathsf{b}^K))]=\sqrt{\frac{2}{\pi}r(r+1)\frac{p}{1-p}}.\]