Polynomials with Zeros on the Unit Circle: Regularity of Leja Sequences

Abstract

Let z1, …, zm be m distinct complex numbers, normalized to |zk| = 1, and consider the polynomial pm(z) = Πk=1m(z-zk). We define a sequence of polynomials in a greedy fashion, pN+1(z) = pN(z) (z - z*) where~z* = |z|=1 |pN(z)|, and prove that, independently of the initial polynomial pm, the roots of pN equidistribute in angle at rate at most (N)2/N. This even persists when sometimes adding `adversarial' points by hand. We rephrase the main result in terms of a dynamical system involving the inverse fractional Laplacian (-)-1/2 and conjecture that, when phrased in this language, the underlying regularity phenomenon might appear in a very general setting.