English

Finite projective planes meet spectral gaps

Combinatorics 2025-10-01 v2 Spectral Theory

Abstract

We show that for any connected graph GG with maximum degree d3d\ge3, the spectral gap from 00 with respect to the adjacency matrix is at most d1\sqrt{d-1}, with equality if and only if GG is the incidence graph of a finite projective plane of order d1d-1; and for other cases, the bound d1\sqrt{d-1} is improved to d2\sqrt{d-2}. This is a spectral gap version of a result by Mohar and Tayfeh-Rezaie. Moreover, for dd-regular graphs with girth at least 7, the bound d2\sqrt{d-2} is further improved to dc(d)\sqrt{d-c(d)} where c(d)2c(d)\ge 2 and limdc(d)/d=(51)/2\lim\limits_{d\to\infty}c(d)/d=(\sqrt{5}-1)/2. A similar yet more subtle phenomenon involving the normalized Laplacian is also investigated, where we work on graphs of degrees d\ge d rather than d\le d. We prove that for any graph GG with \emph{minimum} degree d3d\ge 3, the spectral gap from the value 1 with respect to the normalized Laplacian is at most d1/d\sqrt{d-1}/d, with equality if and only if GG is the incidence graph of a finite projective plane of order d1d-1. As an application, we provide a new sharp bound for the convergence rate of some eigenvalues of the Laplacian on the weighted neighborhood graphs introduced by Bauer and Jost.

Keywords

Cite

@article{arxiv.2509.06247,
  title  = {Finite projective planes meet spectral gaps},
  author = {Yuhan Guo and Dong Zhang},
  journal= {arXiv preprint arXiv:2509.06247},
  year   = {2025}
}

Comments

Comments and corrections are very welcome

R2 v1 2026-07-01T05:25:28.836Z