On the second eigenvalue of random bipartite biregular graphs
Abstract
We consider the spectral gap of a uniformly chosen random -biregular bipartite graph with , where could possibly grow with and . Let be the adjacency matrix of . Under the assumption that and we show that 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 -regular digraph is for with high probability. Assuming is fixed and , we further prove that for a random -biregular bipartite graph, for all 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 -regular graphs and several new switching operations we defined for random bipartite biregular graphs.
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