A combinatorial approach to nonlinear spectral gaps
Abstract
A seminal open question of Pisier and Mendel--Naor asks whether every degree-regular graph which satisfies the classical discrete Poincar\'e inequality for scalar functions, also satisfies an analogous inequality for functions taking values in \textit{any} normed space with non-trivial cotype. Motivated by applications, it is also greatly important to quantify the dependence of the corresponding optimal Poincar\'e constant on the cotype . Works of Odell--Schlumprecht (1994), Ozawa (2004), and Naor (2014) make substantial progress on the former question by providing a positive answer for normed spaces which also have an unconditional basis, in addition to finite cotype. However, little is known in the way of quantitative estimates: the mentioned results imply a bound on the Poincar\'e constant depending super-exponentially on . We introduce a novel combinatorial framework for proving quantitative nonlinear spectral gap estimates. The centerpiece is a property of regular graphs that we call \emph{long range expansion}, which holds with high probability for random regular graphs. Our main result is that any regular graph with the long-range expansion property satisfies a discrete Poincar\'{e} inequality for any normed space with an unconditional basis and cotype , with a Poincar\'{e} constant that depends \emph{polynomially} on , which is optimal. As an application, any normed space with an unconditional basis which admits a low distortion embedding of an -vertex random regular graph, must have cotype at least polylogarithmic in . This extends a celebrated lower-bound of Matou\v{s}ek for low distortion embeddings of random graphs into spaces.
Cite
@article{arxiv.2410.04394,
title = {A combinatorial approach to nonlinear spectral gaps},
author = {Dylan J. Altschuler and Pandelis Dodos and Konstantin Tikhomirov and Konstantinos Tyros},
journal= {arXiv preprint arXiv:2410.04394},
year = {2025}
}
Comments
Revision of Proposition 1.9 to cover more cases; in particular, part (A) of the long-range expansion property holds true for any degree