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Spectral Edge in Sparse Random Graphs: Upper and Lower Tail Large Deviations

Probability 2020-04-02 v1 Discrete Mathematics Mathematical Physics Combinatorics math.MP

Abstract

In this paper we consider the problem of estimating the joint upper and lower tail large deviations of the edge eigenvalues of an Erd\H{o}s-R\'enyi random graph Gn,p\mathcal{G}_{n,p}, in the regime of pp where the edge of the spectrum is no longer governed by global observables, such as the number of edges, but rather by localized statistics, such as high degree vertices. Going beyond the recent developments in mean-field approximations of related problems, this paper provides a comprehensive treatment of the large deviations of the spectral edge in this entire regime, which notably includes the well studied case of constant average degree. In particular, for r1r \geq 1 fixed, we pin down the asymptotic probability that the top rr eigenvalues are jointly greater/less than their typical values by multiplicative factors bigger/smaller than 11, in the regime mentioned above. The proof for the upper tail relies on a novel structure theorem, obtained by building on estimates of Krivelevich and Sudakov (2003), followed by an iterative cycle removal process, which shows, conditional on the upper tail large deviation event, with high probability the graph admits a decomposition in to a disjoint union of stars and a spectrally negligible part. On the other hand, the key ingredient in the proof of the lower tail is a Ramsey-type result which shows that if the KK-th largest degree of a graph is not atypically small (for some large KK depending on rr), then either the top eigenvalue or the rr-th largest eigenvalue is larger than that allowed by the lower tail event on the top rr eigenvalues, thus forcing a contradiction. The above arguments reduce the problems to developing a large deviation theory for the extremal degrees which could be of independent interest.

Keywords

Cite

@article{arxiv.2004.00611,
  title  = {Spectral Edge in Sparse Random Graphs: Upper and Lower Tail Large Deviations},
  author = {Bhaswar B. Bhattacharya and Sohom Bhattacharya and Shirshendu Ganguly},
  journal= {arXiv preprint arXiv:2004.00611},
  year   = {2020}
}

Comments

36 pages, 1 figure

R2 v1 2026-06-23T14:35:46.121Z