The Variance of the Number of Zeros for Complex Random Polynomials Spanned by OPUC

Abstract

Let \k\k=0∞ be a sequence of orthonormal polynomials on the unit circle (OPUC) with respect to a probability measure μ . We study the variance of the number of zeros of random linear combinations of the form Pn(z)=Σk=0nηkk(z), where \ηk\k=0n are complex-valued random variables. Under the assumption that the distribution for each ηk satisfies certain uniform bounds for the fractional and logarithmic moments, for the cases when \k\ are regular in the sense of Ullman-Stahl-Totik or are such that the measure of orthogonality μ satisfies dμ(θ)=w(θ)dθ where w(θ)=v(θ)Πj=1J|θ - θj|αj, with v(θ)≥ c>0, θ,θj∈ [0,2π), and αj>0, we give a quantitative estimate on the the variance of the number of zeros of Pn in sectors that intersect the unit circle. When \k\ are real-valued on the real-line from the Nevai class and \ηk\ are i.i.d.~complex-valued standard Gaussian, we prove a formula for the limiting value of variance of the number of zeros of Pn in annuli that do not contain the unit circle.