Spectra of edge-independent random graphs

Abstract

Let G be a random graph on the vertex set \1,2,..., n\ such that edges in G are determined by independent random indicator variables, while the probability pij for \i,j\ being an edge in G is not assumed to be equal. Spectra of the adjacency matrix and the normalized Laplacian matrix of G are recently studied by Oliveira and Chung-Radcliffe. Let A be the adjacency matrix of G, A=(A), and be the maximum expected degree of G. Oliveira first proved that almost surely \|A- A\|=O( n) provided ≥ C n for some constant C. Chung-Radcliffe improved the hidden constant in the error term using a new Chernoff-type inequality for random matrices. Here we prove that almost surely \|A- A\|≤ (2+o(1)) with a slightly stronger condition 4 n. For the Laplacian L of G, Oliveira and Chung-Radcliffe proved similar results \|L- L|=O( n/δ) provided the minimum expected degree δ n; we also improve their results by removing the n multiplicative factor from the error term under some mild conditions. Our results naturally apply to the classic Erdos-R\'enyi random graphs, random graphs with given expected degree sequences, and bond percolation of general graphs.