Correlations between zeros and critical points of random analytic functions

Abstract

We study the two-point correlation Kmn(z,w) between zeros and critical points of Gaussian random holomorphic sections sn over K\"ahler manifolds. The critical points are points ∇hn sn=0 where ∇hn is the smooth Chern connection with respect to the Hermitian metric hn on line bundle Ln. The main result is that the rescaling limit of Kmn(z0+ u n, z0+ v n) for any z0∈ M is universal as n tends to infinity. In fact, the universal rescaling limit is the two-point correlation between zeros and critical points of Gaussian analytic functions for the Bargmann-Fock space of level 1. Furthermore, there is a 'repulsion' between zeros and critical points for the short range; and a 'neutrality' for the long range.