The limiting spectral law for sparse iid matrices

Abstract

Let A be an n× n matrix with iid entries where Aij Ber(p) is a Bernoulli random variable with parameter p = d/n. We show that the empirical measure of the eigenvalues converges, in probability, to a deterministic distribution as n → ∞. This essentially resolves a long line of work to determine the spectral laws of iid matrices and is the first known example for non-Hermitian random matrices at this level of sparsity.

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