English

An algorithm to evaluate the spectral expansion

Data Structures and Algorithms 2021-06-10 v4 Discrete Mathematics Combinatorics

Abstract

Assume that XX is a connected (q+1)(q+1)-regular undirected graph of finite order nn. Let AA denote the adjacency matrix of XX. Let λ1=q+1>λ2λ3λn\lambda_1=q+1>\lambda_2\geq \lambda_3\geq \ldots \geq \lambda_n denote the eigenvalues of AA. The spectral expansion of XX is defined by Δ(X)=λ1max2inλi. \Delta(X)=\lambda_1-\max_{2\leq i\leq n}|\lambda_i|. By the Alon--Boppana theorem, when nn is sufficiently large, Δ(X)\Delta(X) is quite high if μ(X)=q12max2inλi \mu(X)=q^{-\frac{1}{2}} \max_{2\leq i\leq n}|\lambda_i| is close to 22. In this paper, with the inputs AA and a real number ε>0\varepsilon>0 we design an algorithm to estimate if μ(X)2+ε\mu(X)\leq 2+\varepsilon in O(nωloglog1+εn)O(n^\omega \log \log_{1+\varepsilon} n ) time, where ω<2.3729\omega<2.3729 is the exponent of matrix multiplication.

Keywords

Cite

@article{arxiv.1912.11444,
  title  = {An algorithm to evaluate the spectral expansion},
  author = {Hau-Wen Huang},
  journal= {arXiv preprint arXiv:1912.11444},
  year   = {2021}
}
R2 v1 2026-06-23T12:55:54.403Z