Smallest distances between zeros of Gaussian analytic functions

Abstract

In this article, we study the smallest distances between the zeros of Gaussian analytic functions over compact Riemann surfaces. Our main result is that, after appropriate rescaling, the point process of the smallest distances converge to a Poisson point process with a universal rate. Furthermore, the locations where these smallest distances occur tend to follow a uniform measure with respect to the volume form. As a consequence, the limiting density of the k-th rescaled smallest distance is proportional to x4k-1e-x4 for any k≥ 1. Analogous results hold for the classical Gaussian Entire Functions.