Quantitative Limit Theorems for Cox-Poisson and Cox-Binomial Point Processes
Probability
2025-10-07 v1
Abstract
This paper establishes quantitative limit theorems for two classes of Cox point processes, quantifying their convergence to a Poisson point process (PPP). We employ Stein's method for PPP aproximation, leveraging the generator approach and the Stein-Dirichlet representation formula associated with the Glauber dynamics. First, we investigate a Cox-Poisson process constructed by placing one-dimensional PPPs on the lines of a Poisson line process in \mathbb{S}^2O(1/n)$ to a uniform PPP on the sphere, where n is the number of orbits. The derived bounds provide precise control over the approximation error in both models, with applications in stochastic geometry and spatial statistics.
Cite
@article{arxiv.2510.05004,
title = {Quantitative Limit Theorems for Cox-Poisson and Cox-Binomial Point Processes},
author = {Hamza Adrat and Laurent Decreusefond},
journal= {arXiv preprint arXiv:2510.05004},
year = {2025}
}