On global universality for zeros of random polynomials

Abstract

In this work, we study asymptotic zero distribution of random multi-variable polynomials which are random linear combinations ΣjajPj(z) with i.i.d coefficients relative to a basis of orthonormal polynomials \Pj\j induced by a multi-circular weight function Q satisfying suitable smoothness and growth conditions. In complex dimension m≥3, we prove that E[((1+|aj|))m]<∞ is a necessary and sufficient condition for normalized zero currents of random polynomials to be almost surely asymptotic to the (deterministic) extremal current ddcVQ. In addition, in complex dimension one, we consider random linear combinations of orthonormal polynomials with respect to a regular measure in the sense of Stahl \& Totik and we prove similar results in this setting.