Continuous-state branching processes with competition: duality and reflection at Infinity
Abstract
The boundary behavior of continuous-state branching processes with quadratic competition is studied in whole generality. We first observe that despite competition, explosion can occur for certain branching mechanisms. We obtain a necessary and sufficient condition for to be accessible in terms of the branching mechanism and the competition parameter . We show that when is inaccessible, it is always an entrance boundary. In the case where is accessible, explosion can occur either by a single jump to (the process at jumps to at rate for some ) or by accumulation of large jumps over finite intervals. We construct a natural extension of the minimal process and show that when is accessible and , the extended process is reflected at . In the case , is an exit of the extended process. When the branching mechanism is not the Laplace exponent of a subordinator, we show that the process with reflection at get extinct almost-surely. Moreover absorption at is almost-sure if and only if Grey's condition is satisfied. When the branching mechanism is the Laplace exponent of a subordinator, necessary and sufficient conditions are given for a stationary distribution to exist. The Laplace transform of the latter is provided. The study is based on classical time-change arguments and on a new duality method relating logistic CSBPs with certain generalized Feller diffusions.
Cite
@article{arxiv.1711.06827,
title = {Continuous-state branching processes with competition: duality and reflection at Infinity},
author = {Clément Foucart},
journal= {arXiv preprint arXiv:1711.06827},
year = {2018}
}
Comments
minor modifications and new lemma 4.4