Gaps between Singular Values of Sample Covariance Matrices
Abstract
We study the gaps between consecutive singular values of random rectangular matrices. Specifically, if M is an n × p random matrix with independent and identically distributed entries and is a n × n deterministic positive definite matrix, then under some technical assumptions we give lower bounds for the gaps between consecutive singular values of 1/2 M. As a consequence, we show that sample covariance matrices have simple spectrum with high probability. Our results resolve a conjecture of Vu [ Probab. Surv., 18:179--200, 2021]. We also discuss some applications, including a bound on the spacings of eigenvalues of the adjacency matrix of random bipartite graphs.
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