English

The spectral gap of random regular graphs

Combinatorics 2022-12-06 v2 Probability

Abstract

We bound the second eigenvalue of random dd-regular graphs, for a wide range of degrees dd, using a novel approach based on Fourier analysis. Let Gn,dG_{n, d} be a uniform random dd-regular graph on nn vertices, and let λ(Gn,d)\lambda (G_{n, d}) be its second largest eigenvalue by absolute value. For some constant c>0c > 0 and any degree dd with log10ndcn\log^{10} n \ll d \leq c n, we show that λ(Gn,d)=(2+o(1))d(nd)/n\lambda (G_{n, d}) = (2 + o(1)) \sqrt{d (n - d) / n} asymptotically almost surely. Combined with earlier results that cover the case of sparse random graphs, this fully determines the asymptotic value of λ(Gn,d)\lambda (G_{n, d}) for all dcnd \leq c n. To achieve this, we introduce new methods that use mechanisms from discrete Fourier analysis, and combine them with existing tools and estimates on dd-regular random graphs - especially those of Liebenau and Wormald.

Keywords

Cite

@article{arxiv.2201.02015,
  title  = {The spectral gap of random regular graphs},
  author = {Amir Sarid},
  journal= {arXiv preprint arXiv:2201.02015},
  year   = {2022}
}

Comments

38 pages, 1 figure

R2 v1 2026-06-24T08:41:49.111Z