Explicit bounds from the Alon-Boppana theorem
arXiv:1306.6548 · doi:10.1080/10586458.2017.1311813
Abstract
The purpose of this paper is to give explicit methods for bounding the number of vertices of finite $k$-regular graphs with given second eigenvalue. Let $X$ be a finite $k$-regular graph and $μ_1(X)$ the second largest eigenvalue of its adjacency matrix. It follows from the well-known Alon-Boppana Theorem, that for any $ε> 0$ there are only finitely many such $X$ with $μ_1(X) < (2 - ε) \sqrt{k - 1}$, and we effectively implement Serre's quantitative version of this result. For any $k$ and $ε$, this gives an explicit upper bound on the number of vertices in a $k$-regular graph with $μ_1(X) < (2 - ε) \sqrt{k - 1}$.
To appear in Exp. Math