English

Approximation of birth-death processes

Probability 2024-09-10 v1

Abstract

The birth-death process is a special type of continuous-time Markov chain with index set N\mathbb{N}. Its resolvent matrix can be fully characterized by a set of parameters (γ,β,ν)(\gamma, \beta, \nu), where γ\gamma and β\beta are non-negative constants, and ν\nu is a positive measure on N\mathbb{N}. By employing the Ray-Knight compactification, the birth-death process can be realized as a c\`adl\`ag process with strong Markov property on the one-point compactification space N\overline{\mathbb{N}}_{\partial}, which includes an additional cemetery point \partial. In a certain sense, the three parameters that determine the birth-death process correspond to its killing, reflecting, and jumping behaviors at \infty used for the one-point compactification, respectively. In general, providing a clear description of the trajectories of a birth-death process, especially in the pathological case where ν=|\nu|=\infty, is challenging. This paper aims to address this issue by studying the birth-death process using approximation methods. Specifically, we will approximate the birth-death process with simpler birth-death processes that are easier to comprehend. For two typical approximation methods, our main results establish the weak convergence of a sequence of probability measures, which are induced by the approximating processes, on the space of all c\`adl\`ag functions. This type of convergence is significantly stronger than the convergence of transition matrices typically considered in the theory of continuous-time Markov chains.

Keywords

Cite

@article{arxiv.2409.05018,
  title  = {Approximation of birth-death processes},
  author = {Liping Li},
  journal= {arXiv preprint arXiv:2409.05018},
  year   = {2024}
}
R2 v1 2026-06-28T18:37:37.370Z