Extinction times for a general birth, death and catastrophe process
Ben Cairns and P. K. Pollett
Source: J. Appl. Probab.
Volume 41, Number 4
(2004), 1211-1218.
Abstract
The birth, death and catastrophe process is an extension of the
birth-death process that incorporates the possibility of
reductions in population of arbitrary size. We will consider a
general form of this model in which the transition rates are
allowed to depend on the current population size in an arbitrary
manner. The linear case, where the transition rates are
proportional to current population size, has been studied
extensively. In particular, extinction probabilities, the expected
time to extinction, and the distribution of the population size
conditional on nonextinction (the quasi-stationary distribution)
have all been evaluated explicitly. However, whilst these
characteristics are of interest in the modelling and management of
populations, processes with linear rate coefficients represent
only a very limited class of models. We address this limitation by
allowing for a wider range of catastrophic events. Despite this
generalisation, explicit expressions can still be found for the
expected extinction times.
Primary Subjects: 60J27
Secondary Subjects: 92B05, 60J80
Keywords: Catastrophe process; persistence time; hitting time
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Links and Identifiers
Permanent link to this document: http://projecteuclid.org/euclid.jap/1101840567
Digital Object Identifier: doi:10.1239/jap/1101840567
Mathematical Reviews number (MathSciNet):
MR2122816
Zentralblatt MATH identifier:
1063.60106
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