English

Concentration and regularization of random graphs

Probability 2016-08-10 v2 Social and Information Networks Statistics Theory Statistics Theory

Abstract

This paper studies how close random graphs are typically to their expectations. We interpret this question through the concentration of the adjacency and Laplacian matrices in the spectral norm. We study inhomogeneous Erd\"os-R\'enyi random graphs on nn vertices, where edges form independently and possibly with different probabilities pijp_{ij}. Sparse random graphs whose expected degrees are o(logn)o(\log n) fail to concentrate; the obstruction is caused by vertices with abnormally high and low degrees. We show that concentration can be restored if we regularize the degrees of such vertices, and one can do this in various ways. As an example, let us reweight or remove enough edges to make all degrees bounded above by O(d)O(d) where d=maxnpijd=\max np_{ij}. Then we show that the resulting adjacency matrix AA' concentrates with the optimal rate: AEA=O(d)\|A' - \mathbb{E} A\| = O(\sqrt{d}). Similarly, if we make all degrees bounded below by dd by adding weight d/nd/n to all edges, then the resulting Laplacian concentrates with the optimal rate: L(A)L(EA)=O(1/d)\|L(A') - L(\mathbb{E} A')\| = O(1/\sqrt{d}). Our approach is based on Grothendieck-Pietsch factorization, using which we construct a new decomposition of random graphs. We illustrate the concentration results with an application to the community detection problem in the analysis of networks.

Keywords

Cite

@article{arxiv.1506.00669,
  title  = {Concentration and regularization of random graphs},
  author = {Can M. Le and Elizaveta Levina and Roman Vershynin},
  journal= {arXiv preprint arXiv:1506.00669},
  year   = {2016}
}

Comments

21 pages. Elizaveta Levina is added as a co-author. Application to community detection of networks is expanded

R2 v1 2026-06-22T09:45:20.869Z