Spectrum of non-Hermitian heavy tailed random matrices

Abstract

Let (Xjk)j,k>=1 be i.i.d. complex random variables such that |Xjk| is in the domain of attraction of an alpha-stable law, with 0< alpha <2. Our main result is a heavy tailed counterpart of Girko's circular law. Namely, under some additional smoothness assumptions on the law of Xjk, we prove that there exists a deterministic sequence an ~ n1/alpha and a probability measure mualpha on C depending only on alpha such that with probability one, the empirical distribution of the eigenvalues of the rescaled matrix an-1 (Xjk)1<=j,k<=n converges weakly to mualpha as n tends to infinity. Our approach combines Aldous & Steele's objective method with Girko's Hermitization using logarithmic potentials. The underlying limiting object is defined on a bipartized version of Aldous' Poisson Weighted Infinite Tree. Recursive relations on the tree provide some properties of mualpha. In contrast with the Hermitian case, we find that mualpha is not heavy tailed.