English

Separated determinantal point processes and generalized Fock spaces

Complex Variables 2025-02-11 v2 Functional Analysis Probability

Abstract

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

Keywords

Cite

@article{arxiv.2502.02237,
  title  = {Separated determinantal point processes and generalized Fock spaces},
  author = {Giuseppe Lamberti and Xavier Massaneda},
  journal= {arXiv preprint arXiv:2502.02237},
  year   = {2025}
}
R2 v1 2026-06-28T21:31:59.593Z