Determinantal point processes with J-Hermitian correlation kernels

Abstract

Let X be a locally compact Polish space and let m be a reference Radon measure on X. Let X denote the configuration space over X, that is, the space of all locally finite subsets of X. A point process on X is a probability measure on X. A point process μ is called determinantal if its correlation functions have the form k(n)(x1,…,xn)=[K(xi,xj)]i,j=1,…,n. The function K(x,y) is called the correlation kernel of the determinantal point process μ. Assume that the space X is split into two parts: X=X1 X2. A kernel K(x,y) is called J-Hermitian if it is Hermitian on X1× X1 and X2× X2, and K(x,y)=-K(y,x) for x∈ X1 and y∈ X2. We derive a necessary and sufficient condition of existence of a determinantal point process with a J-Hermitian correlation kernel K(x,y).