Interconnected population processes

E. Renshaw

doi:10.2307/3212491

Abstract

This paper investigates the effect of migration between two colonies each of which undergoes a simple birth and death process. Expressions are obtained for the first two moments and approximate solutions are developed for the probability generating function of the colony sizes.

References

Adke, S. R. (1969) A birth, death and migration process. J. Appl. Prob. 6, 687–691.Google Scholar

Bailey, N. T. J. (1968) Stochastic birth, death and migration processes for spatially distributed populations. Biometrika 55, 189–198.Google Scholar

Bartlett, M. S. (1966) An Introduction to Stochastic Processes. (2nd edition) Cambridge University Press.Google Scholar

Bellman, R. (1953) Stability Theory of Differential Equations. McGraw-Hill, New York.Google Scholar

Davis, A. W. (1965) On the theory of birth, death and diffusion processes. J. Appl. Prob. 2, 293–322.Google Scholar

Davis, A. W. (1970) Some generalisations of Bailey's birth, death and migration model. Adv. Appl. Prob. 2, 83–109.CrossRef Google Scholar

Feller, W. (1966) An Introduction to Probability Theory and its Applications. Vol. 2. Wiley, New York.Google Scholar

Puri, P. S. (1968) Interconnected birth and death processes. J. Appl. Prob. 5, 334–349.Google Scholar

Renshaw, E. (1972) Birth, death and migration processes. Biometrika 59, 49–60.CrossRef Google Scholar

Usher, M. B. and Williamson, M. H. (1970) A deterministic matrix model for handling the birth, death and migration processes of spatially distributed populations. Biometrics 26, 1–12.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Renshaw, E. 1974. Stepping stone models for population growth. Journal of Applied Probability, Vol. 11, Issue. 1, p. 16.

Aksland, M. 1975. A birth, death and migration process by immigration. Advances in Applied Probability, Vol. 7, Issue. 1, p. 44.

Morgan, Byron J. T. and Hinde, John P. 1976. On an approximation made when analysing stochastic processes. Journal of Applied Probability, Vol. 13, Issue. 04, p. 672.

Faddy, M. J. 1977. Stochastic compartmental models as approximations to more general stochastic systems with the general stochastic epidemic as an example. Advances in Applied Probability, Vol. 9, Issue. 3, p. 448.

Neveu, J. 1977. Ecole d’Eté de Probabilités de Saint-Flour VI-1976. Vol. 598, Issue. , p. 249.

Parthasarathy, P. R. and Mayilswami, P. 1981. Stochastic compartmental model with branching particles. Bulletin of Mathematical Biology, Vol. 43, Issue. 3, p. 347.

Parthasarathy, P.R. and Mayilswami, P. 1982. Stochastic compartmental models with birth, death and immigration of particles. Communications in Statistics - Theory and Methods, Vol. 11, Issue. 14, p. 1625.

Parthasarathy, P. R. and Mayilswami, P. 1982. Stochastic compartmental models with banching and immigrant particles. Bulletin of Mathematical Biology, Vol. 44, Issue. 1, p. 75.

Renshaw, Eric 1986. A survey of stepping-stone models in population dynamics. Advances in Applied Probability, Vol. 18, Issue. 3, p. 581.

Picard, Philippe 1989. Two variants of the first Nåsell-Hirsch model. Mathematical Biosciences, Vol. 94, Issue. 1, p. 45.

Parthasarathy, P.R. and Krishna kumar, B. 1991. A birth and death process with logistic mean population. Communications in Statistics - Theory and Methods, Vol. 20, Issue. 2, p. 621.

Kumar, B.Krishna and Parthasarathy, P.R. 1992. Number of deaths in semi-Markov compartmental system with branching particles. Mathematical and Computer Modelling, Vol. 16, Issue. 12, p. 29.

Zheng, Qi and Matis, James H. 1993. Some applications, properties and conjectures for higher order cumulants of a markovian stepping-stone model. Communications in Statistics - Theory and Methods, Vol. 22, Issue. 12, p. 3305.

Kumar, B. Krishna and Parathasarathy, P.R. 1993. Semi‐Markov compartmental systems with branching particles. International Journal of Mathematical Education in Science and Technology, Vol. 24, Issue. 6, p. 875.

Zheng, Qi and Matis, James H. 1993. Approximating discrete multivariate distributions prom known moments. Communications in Statistics - Theory and Methods, Vol. 22, Issue. 12, p. 3553.

Renshaw, Eric and Dai, Yonglong 1997. Regularity and reversibility results for birth-death-migration processes. Journal of Applied Probability, Vol. 34, Issue. 03, p. 685.

Zheng, Qi Lutz, Werner K. and Gaylor, David W. 1997. A carcinogenesis model describing mutational events at the DNA adduct level. Mathematical Biosciences, Vol. 144, Issue. 1, p. 23.

Vijay Kumar, A. Krishna Kumar, B. and Thilaka, B. 1998. On semi-markov compartmental models with branching particles under the influence of disasters. Communications in Statistics - Theory and Methods, Vol. 27, Issue. 5, p. 1101.

Vijayakumar, A. Krishna Kumar, B. and Thilaka, B. 2000. Stochastic compartmental mooeld with branching particles and disasters: sojourn time and related characteristics. Communications in Statistics - Theory and Methods, Vol. 29, Issue. 2, p. 291.

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Interconnected population processes

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