Article contents
On the Extinction of a Class of Population-Size-Dependent Bisexual Branching Processes
Part of:
Markov processes
Published online by Cambridge University Press: 14 July 2016
Abstract
Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.
In this paper, we study a class of bisexual Galton-Watson branching processes in which the law of offspring distribution is dependent on the population size. Under a suitable condition on the offspring distribution, we prove that the limit of mean growth-rate per mating unit exists. Based on this limit, we give a criterion to identify whether the process admits ultimate extinction with probability one.
Keywords
MSC classification
- Type
- Research Papers
- Information
- Copyright
- © Applied Probability Trust 2005
Footnotes
Supported by the Natural Science Foundation of China (grant no. 10131040).
References
Alsmeyer, G. and Rösler, U. (1996). The bisexual Galton–Watson process with promiscuous mating: extinction probabilities in the supercritical case. Ann. Appl. Prob.
6, 922–939.Google Scholar
Bruss, F. T. (1984). A note on extinction criteria for bisexual Galton–Watson branching processes. J. Appl. Prob.
21, 915–919.CrossRefGoogle Scholar
Daley, D. J. (1968a). Extinction conditions for certain bisexual Galton–Watson processes. Z. Wahrscheinlichkeitsth.
9, 315–322.CrossRefGoogle Scholar
Daley, D. J. (1968b). Stochastically monotone Markov chains. Z. Wahrscheinlichkeitsth.
10, 305–317.Google Scholar
Daley, D. J., Hull, D. A. and Taylor, J. M. (1986). Bisexual Galton–Watson branching processes with superadditive mating functions. J. Appl. Prob.
23, 585–600.CrossRefGoogle Scholar
Hull, D. M. (1982). A necessary condition for extinction in those bisexual Galton–Watson branching processes governed by superadditive mating functions. J. Appl. Prob.
19, 847–850.CrossRefGoogle Scholar
Hull, D. M. (1984). Conditions for extinction in certain bisexual Galton–Watson branching processes. J. Appl. Prob.
21, 414–418.CrossRefGoogle Scholar
Kamae, T., Krengel, U. and O'Brien, G. L. (1977). Stochastic inequalities on partially ordered spaces. Ann. Prob.
5, 899–912.CrossRefGoogle Scholar
Klebaner, F. C. (1984). On population-size-dependent branching processes. Adv. Appl. Prob.
16, 30–45.CrossRefGoogle Scholar
Molina, M., Mota, M. and Ramos, A. (2002). Bisexual Galton–Watson branching process with population-size-dependent mating. J. Appl. Prob.
39, 479–490.Google Scholar
You have
Access
- 16
- Cited by