A necessary and sufficient condition for convergence of the zeros of random polynomials

Abstract

Consider random polynomials of the form Gn = Σi=0n i pi, where the i are i.i.d.\ non-degenerate complex random variables, and \pi\ is a sequence of orthonormal polynomials with respect to a regular measure τ supported on a compact set K. We show that the zero measure of Gn converges weakly almost surely to the equilibrium measure of K if and only if E (1 + |0|) < ∞. This generalizes the corresponding result of Ibragimov and Zaporozhets in the case when pi(z) = zi. We also show that the zero measure of Gn converges weakly in probability to the equilibrium measure of K if and only if P (|0| > en) = o(n-1). Our proofs rely on results from small ball probability and exploit the structure of general orthogonal polynomials. Our methods also work for sequences of asymptotically minimal polynomials in Lp(τ), where p ∈ (0, ∞]. In particular, sequences of Lp-minimal polynomials and (normalized) Faber and Fekete polynomials fall into this class.