Non-Hermitian random matrices with a variance profile (II): properties and examples

Abstract

For each n, let An=(σij) be an n× n deterministic matrix and let Xn=(Xij) be an n× n random matrix with i.i.d. centered entries of unit variance. In the companion article Cook et al., we considered the empirical spectral distribution μnY of the rescaled entry-wise product \[ Yn = 1n An Xn = (1n σijXij) \] and provided a deterministic sequence of probability measures μn such that the difference μYn - μn converges weakly in probability to the zero measure. A key feature in Cook et al. was to allow some of the entries σij to vanish, provided that the standard deviation profiles An satisfy a certain quantitative irreducibility property. In the present article, we provide more information on the sequence (μn), described by a family of Master Equations. We consider these equations in important special cases such as separable variance profiles σ2ij=di dj and sampled variance profiles σ2ij = σ2( in, jn ) where (x,y) σ2(x,y) is a given function on [0,1]2. Associate examples are provided where μnY converges to a genuine limit. We study μn's behavior at zero and provide examples where μn's density is bounded, blows up, or vanishes while an atom appears. As a consequence, we identify the profiles that yield the circular law. Finally, building upon recent results from Alt et al., we prove that except maybe in zero, μn admits a positive density on the centered disc of radius (Vn), where Vn=( 1n σij2) and (Vn) is its spectral radius.