Small ball probability for multiple singular values of symmetric random matrices

Abstract

Let An be an n× n random symmetric matrix with (Aij)i< j i.i.d. mean 0, variance 1, following a subGaussian distribution and diagonal elements i.i.d. following a subGaussian distribution with a fixed variance. We investigate the joint small ball probability that An has eigenvalues near two fixed locations λ1 and λ2, where λ1 and λ2 are sufficiently separated and in the bulk of the semicircle law. More precisely we prove that for a wide class of entry distributions of Aij that involve all Gaussian convolutions (where σmin(·) denotes the least singular value of a square matrix), P(σmin(An-λ1 In)≤δ1n-1/2,σmin(An-λ2 In)≤δ2n-1/2)≤ cδ1δ2+e-cn. The given estimate approximately factorizes as the product of the estimates for the two individual events, which is an indication of quantitative independence. The estimate readily generalizes to d distinct locations. As an application, we upper bound the probability that there exist d eigenvalues of An asymptotically satisfying any fixed linear equation, which in particular gives a lower bound of the distance to this linear relation from any possible eigenvalue pair that holds with probability 1-o(1), and rules out the existence of two equal singular values in generic regions of the spectrum.

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