Extreme Values of Permutation Statistics
Abstract
We investigate extreme values of Mahonian and Eulerian distributions arising from counting inversions and descents of random elements of finite Coxeter groups. To this end, we construct a triangular array of either distribution from a sequence of Coxeter groups with increasing ranks. To avoid degeneracy of extreme values, the number of i.i.d. samples in each row must be asymptotically bounded. We employ large deviations theory to prove the Gumbel attraction of Mahonian and Eulerian distributions. It is shown that for the two classes, different bounds on ensure this.
Cite
@article{arxiv.2205.01426,
title = {Extreme Values of Permutation Statistics},
author = {Philip Dörr and Thomas Kahle},
journal= {arXiv preprint arXiv:2205.01426},
year = {2025}
}
Comments
15 pages, comments welcome, v2: more detailed analysis of k_n, 18 pages, v3: final version. Numbering of statements adjusted to match published version, includes minor improvements over published version (see footnotes)