Concentration of the spectral norm of ErdÅs-Rényi random graphs
arXiv:1801.02157
Abstract
We present results on the concentration properties of the spectral norm $\|A_p\|$ of the adjacency matrix $A_p$ of an ErdÅs-Rényi random graph $G(n,p)$. First we consider the ErdÅs-Rényi random graph process and prove that $\|A_p\|$ is uniformly concentrated over the range $p\in [C\log n/n,1]$. The analysis is based on delocalization arguments, uniform laws of large numbers, together with the entropy method to prove concentration inequalities. As an application of our techniques we prove sharp sub-Gaussian moment inequalities for $\|A_p\|$ for all $p\in [c\log^3n/n,1]$ that improve the general bounds of Alon, Krivelevich, and Vu (2001) and some of the more recent results of ErdÅs et al. (2013). Both results are consistent with the asymptotic result of Füredi and Komlós (1981) that holds for fixed $p$ as $n\to \infty$.
23 pages, Proposition 2 was added