Typical hyperbolic surfaces have an optimal spectral gap
Abstract
The first non-zero Laplace eigenvalue of a hyperbolic surface, or its spectral gap, measures how well-connected the surface is: surfaces with a large spectral gap are hard to cut in pieces, have a small diameter and fast mixing times. For large hyperbolic surfaces (of large area or large genus , equivalently), we know that the spectral gap is asymptotically bounded above by . The aim of these talks is to present joint work with Nalini Anantharaman, where we prove that most hyperbolic surfaces have a near-optimal spectral gap. That is to say, we prove that, for any , the Weil--Petersson probability for a hyperbolic surface of genus to have a spectral gap greater than goes to one as goes to infinity. This statement is analogous to Alon's 1986 conjecture for regular graphs, proven by Friedman in 2003. I will present our approach, which shares many similarities with Friedman's work, and introduce new tools and ideas that we have developed in order to tackle this problem.
Cite
@article{arxiv.2601.15157,
title = {Typical hyperbolic surfaces have an optimal spectral gap},
author = {Laura Monk},
journal= {arXiv preprint arXiv:2601.15157},
year = {2026}
}
Comments
44 pages; survey paper for Current Developments in Mathematics 2025