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Spectra of edge-independent random graphs

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 $p_{ij}$ 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 $G$, $\bar A=\E(A)$, and $Δ$ be the maximum expected degree of $G$. Oliveira first proved that almost surely $\|A-\bar A\|=O(\sqrt{Δ\ln n})$ provided $Δ\geq C \ln n$ 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 $\|A-\bar A\|\leq (2+o(1))\sqrtΔ$ with a slightly stronger condition $Δ\gg \ln^4 n$. For the Laplacian $L$ of $G$, Oliveira and Chung-Radcliffe proved similar results $\|L-\bar L|=O(\sqrt{\ln n}/\sqrtδ)$ provided the minimum expected degree $δ\gg \ln n$; we also improve their results by removing the $\sqrt{\ln n}$ multiplicative factor from the error term under some mild conditions. Our results naturally apply to the classic Erdős-Rényi random graphs, random graphs with given expected degree sequences, and bond percolation of general graphs.