Aldous' Spectral Gap Conjecture for Normal Sets
Abstract
Let denote the symmetric group on elements, and a symmetric subset of permutations. Aldous' spectral gap conjecture, proved by Caputo, Liggett and Richthammer [arXiv:0906.1238], states that if is a set of transpositions, then the second eigenvalue of the Cayley graph is identical to the second eigenvalue of the Schreier graph on vertices depicting the action of on . Inspired by this seminal result, we study similar questions for other types of sets in . Specifically, we consider normal sets: sets that are invariant under conjugation. Relying on character bounds due to Larsen and Shalev [2008], we show that for large enough , if is a full conjugacy class, then the second eigenvalue of is roughly identical to the second eigenvalue of the Schreier graph depicting the action of on ordered -tuples of elements from . We further show that this type of result does not hold when is an arbitrary normal set, but a slightly weaker one does hold. We state a conjecture in the same spirit regarding an arbitrary symmetric set , which yields surprisingly strong consequences.
Cite
@article{arxiv.1804.02776,
title = {Aldous' Spectral Gap Conjecture for Normal Sets},
author = {Ori Parzanchevski and Doron Puder},
journal= {arXiv preprint arXiv:1804.02776},
year = {2020}
}
Comments
18 pages, 4 tables, journal version, improved exposition, to appear in TAMS (Transactions of the American Mathematical Society)