Correlations and Pairing Between Zeros and Critical Points of Gaussian Random Polynomials

Abstract

We study the asymptotics of correlations and nearest neighbor spacings between zeros and holomorphic critical points of pN, a degree N Hermitian Gaussian random polynomial in the sense of Shiffman and Zeldtich, as N goes to infinity. By holomorphic critical point we mean a solution to the equation ddzpN(z)=0. Our principal result is an explicit asymptotic formula for the local scaling limit of ZpN CpN, the expected joint intensity of zeros and critical points, around any point on the Riemann sphere. Here ZpN and CpN are the currents of integration (i.e. counting measures) over the zeros and critical points of pN, respectively. We prove that correlations between zeros and critical points are short range, decaying like e-Nz-w2. With z-w on the order of N-1/2, however, ZpN CpN(z,w) is sharply peaked near z=w, causing zeros and critical points to appear in rigid pairs. We compute tight bounds on the expected distance and angular dependence between a critical point and its paired zero.