Spectral measure of heavy tailed band and covariance random matrices

Abstract

We study the asymptotic behavior of the appropriately scaled and possibly perturbed spectral measure μ of large random real symmetric matrices with heavy tailed entries. Specifically, consider the N by N symmetric matrix YNσ whose (i,j) entry is σ(i/N,j/N)Xij where (Xij, 0<i<j+1<∞) is an infinite array of i.i.d real variables with common distribution in the domain of attraction of an α-stable law, 0<α<2, and σ is a deterministic function. For a random diagonal DN independent of YNσ and with appropriate rescaling aN, we prove that the distribution μ of aN-1YNσ + DN converges in mean towards a limiting probability measure which we characterize. As a special case, we derive and analyze the almost sure limiting spectral density for empirical covariance matrices with heavy tailed entries.