Asymptotic distribution of complex zeros of random analytic functions

Abstract

Let 0,1,… be independent identically distributed complex- valued random variables such that E(1+| 0|)<∞. We consider random analytic functions of the form \[Gn(z)=Σk=0∞kfk,nzk,\] where fk,n are deterministic complex coefficients. Let μn be the random measure counting the complex zeros of Gn according to their multiplicities. Assuming essentially that -1n f[tn],n u(t) as n∞, where u(t) is some function, we show that the measure 1nμn converges in probability to some deterministic measure μ which is characterized in terms of the Legendre-Fenchel transform of u. The limiting measure μ does not depend on the distribution of the k's. This result is applied to several ensembles of random analytic functions including the ensembles corresponding to the three two-dimensional geometries of constant curvature. As another application, we prove a random polynomial analogue of the circular law for random matrices.