Upper Tails for Edge Eigenvalues of Random Graphs

Abstract

The upper tail problem for the largest eigenvalue of the Erdos--R\'enyi random graph Gn,p is to estimate the probability that the largest eigenvalue of the adjacency matrix of Gn,p exceeds its typical value by a factor of 1+δ. In this note we show that for δ >0 fixed, and p → 0 such that n12 p → ∞, the upper tail probability for the largest eigenvalue of Gn,p is [-(1+o(1)) \(1+δ)22, δ(1+δ) \ n2p2 (1/p)]. In the same regime of p, we show that the second largest eigenvalue λ2( Gn,p) of the adjacency matrix of Gn,p satisfies P(λ2( Gn,p) δ np) = [-(1+o(1)) 12 δ2n2p2 (1/p) ], where δ =δn < 1 can depend on n such that δ n12 p → ∞, which covers deviations of λ2( Gn,p) between n12 and np. Our arguments build on recent results on the large deviations of the largest eigenvalue and related non-linear functions of the adjacency matrix in terms of natural mean-field entropic variational problems.