English

Extinction probabilities in branching processes with countably many types: a general framework

Probability 2020-11-23 v1

Abstract

We consider Galton-Watson branching processes with countable typeset X\mathcal{X}. We study the vectors q(A)=(qx(A))xX{\bf q}(A)=(q_x(A))_{x\in\mathcal{X}} recording the conditional probabilities of extinction in subsets of types AXA\subseteq \mathcal{X}, given that the type of the initial individual is xx. We first investigate the location of the vectors q(A){\bf q}(A) in the set of fixed points of the progeny generating vector and prove that qx({x})q_x(\{x\}) is larger than or equal to the xxth entry of any fixed point, whenever it is different from 1. Next, we present equivalent conditions for qx(A)<qx(B)q_x(A)< q_x (B) for any initial type xx and A,BXA,B\subseteq \mathcal{X}. Finally, we develop a general framework to characterise all \emph{distinct} extinction probability vectors, and thereby to determine whether there are finitely many, countably many, or uncountably many distinct vectors. We illustrate our results with examples, and conclude with open questions.

Keywords

Cite

@article{arxiv.2011.10071,
  title  = {Extinction probabilities in branching processes with countably many types: a general framework},
  author = {Daniela Bertacchi and Peter Braunsteins and Sophie Hautphenne and Fabio Zucca},
  journal= {arXiv preprint arXiv:2011.10071},
  year   = {2020}
}

Comments

33 pages, 7 figures

R2 v1 2026-06-23T20:22:53.553Z