Separated determinantal point processes and generalized Fock spaces

Abstract

We study conditions so that the determinantal point process φ associated to a generalized Fock space defined by a doubling subharmonic weight φ is almost surely a separated sequence in C. Under a natural assumption on φ, we provide a characterization of such processes. Additionally, we emphasize the role of intrinsic repulsion in determinantal processes by comparing φ with the Poisson process of the same first intensity. As an application, we show that the determinantal process α associated to the canonical weight φα(z)=|z|α, α>0, is almost surely separated if and only if α<4/3. In contrast, the Poisson process αP having the same first intensity as α is almost surely separated if and only if α<1.

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