Separation properties of a hybrid point process with determinantal radii and uniform arguments

Abstract

We recently characterized the separated determinantal point processes φ associated with Fock spaces Fφ in the plane with doubling weight φ. We also showed that, as expected, a more restrictive condition is required to characterize the separated Poisson processes with the same first intensities as φ. To gain further insight into this different behavior, we center our attention to radial weights φ(z) and introduce a hybrid process φM=\rk eiθk\k=1∞, where the moduli rk are taken from φ, while the arguments θk are chosen independently and uniformly in [0,2π). Our main result is that φM is almost surely separated if and only if its first intensity satisfies the same condition as in the Poisson case.