High-dimensional sample covariance matrices with Curie-Weiss entries

Abstract

We study the limiting spectral distribution of sample covariance matrices XXT, where X are p× n random matrices with correlated entries, for the cases p/n y∈ [0,∞). If y>0, we obtain the Marcenko-Pastur distribution and in the case y=0 the semicircle distribution (after appropriate rescaling). The entries we consider are Curie-Weiss spins, which are correlated random signs, where the degree of the correlation is governed by an inverse temperature β>0. The model exhibits a phase transition at β=1. The correlation between any two entries decays at a rate of O(np) for β ∈ (0,1), O(np) for β=1, and for β>1 the correlation does not vanish in the limit. In our proofs we use Stieltjes transforms and concentration of random quadratic forms.