English

On the second eigenvalue of random bipartite biregular graphs

Probability 2023-06-01 v6 Combinatorics

Abstract

We consider the spectral gap of a uniformly chosen random (d1,d2)(d_1,d_2)-biregular bipartite graph GG with V1=n,V2=m|V_1|=n, |V_2|=m, where d1,d2d_1,d_2 could possibly grow with nn and mm. Let AA be the adjacency matrix of GG. Under the assumption that d1d2d_1\geq d_2 and d2=O(n2/3),d_2=O(n^{2/3}), we show that λ2(A)=O(d1)\lambda_2(A)=O(\sqrt{d_1}) with high probability. As a corollary, combining the results from Tikhomirov and Youssef (2019), we showed that the second singular value of a uniform random dd-regular digraph is O(d)O(\sqrt{d}) for 1dn/21\leq d\leq n/2 with high probability. Assuming d2d_2 is fixed and d1=O(n2)d_1=O(n^2), we further prove that for a random (d1,d2)(d_1,d_2)-biregular bipartite graph, λi2(A)d1=O(d1)|\lambda_i^2(A)-d_1|=O(\sqrt{d_1}) for all 2in+m12\leq i\leq n+m-1 with high probability. The proofs of the two results are based on the size biased coupling method introduced in Cook, Goldstein, and Johnson (2018) for random dd-regular graphs and several new switching operations we defined for random bipartite biregular graphs.

Keywords

Cite

@article{arxiv.2005.08103,
  title  = {On the second eigenvalue of random bipartite biregular graphs},
  author = {Yizhe Zhu},
  journal= {arXiv preprint arXiv:2005.08103},
  year   = {2023}
}

Comments

23 pages, 3 figures

R2 v1 2026-06-23T15:35:52.525Z