Universality for zeros of random analytic functions

Abstract

Let 0,1,... be independent identically distributed (i.i.d.) random variables such that (1+|0|)<∞. We consider random analytic functions of the form Gn(z)=Σk=0∞ k fk,n zk, where fk,n are deterministic complex coefficients. Let n be the random measure assigning the same weight 1/n to each complex zero of Gn. Assuming essentially that - 1n f[tn], n u(t) as n∞, where u(t) is some function, we show that the measure n converges weakly to some deterministic measure which is characterized in terms of the Legendre--Fenchel transform of u. The limiting measure is universal, that is it 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.