Distances between zeroes and critical points for random polynomials with i.i.d. zeroes

Abstract

Consider a random polynomial Qn of degree n+1 whose zeroes are i.i.d. random variables 0,1,…,n in the complex plane. We study the pairing between the zeroes of Qn and its critical points, i.e. the zeroes of its derivative Qn'. In the asymptotic regime when n∞, with high probability there is a critical point of Qn which is very close to 0. We localize the position of this critical point by proving that the difference between 0 and the critical point has approximately complex Gaussian distribution with mean 1/(nf(0)) and variance of order n · n-3. Here, f(z)= E[1/(z-k)] is the Cauchy-Stieltjes transform of the k's. We also state some conjectures on critical points of polynomials with dependent zeroes, for example the Weyl polynomials and characteristic polynomials of random matrices.