Multivariate CLT follows from strong Rayleigh property

Abstract

Let (X1 , … , Xd) be random variables taking nonnegative integer values and let f(z1, … , zd) be the probability generating function. Suppose that f is real stable; equivalently, suppose that the polarization of this probability distribution is strong Rayleigh. In specific examples, such as occupation counts of disjoint sets by a determinantal point process, it is known~soshnikov02 that the joint distribution must approach a multivariate Gaussian distribution. We show that this conclusion follows already from stability of f.