Multivariate birth-and-death processes as approximations to epidemic processes
- 1 March 1973
- journal article
- Published by Cambridge University Press (CUP) in Journal of Applied Probability
- Vol. 10 (1), 15-26
- https://doi.org/10.2307/3212492
Abstract
This paper presents the theory of a multivariate birth-and-death process and its representation as a branching process. The bivariate linear birth-and-death process may be used as a model for various epidemic situations involving two types of infective. Various properties of the transient process are discussed and the distribution of epidemic size is investigated. For the case of a disease spread solely by carriers when the two types of infective are carriers and clinical infectives the large population version of a model proposed by Downton (1968) is further developed and shown under appropriate circumstances to closely approximate Downton's model.Keywords
This publication has 16 references indexed in Scilit:
- A bivariate birth-death process which approximates to the spread of a disease involving a vectorJournal of Applied Probability, 1972
- The ultimate size of carrier-borne epidemicsBiometrika, 1968
- Epidemics with carriers: The large population approximationJournal of Applied Probability, 1967
- Epidemics with carriers: A note on a paper of DietzJournal of Applied Probability, 1967
- On the model of Weiss for the spread of epidemics by carriersJournal of Applied Probability, 1966
- Some Multi-Dimensional Birth and Death Processes and Their Applications in Population GeneticsBiometrics, 1962
- STOCHASTIC CROSS-INFECTION BETWEEN TWO OTHERWISE ISOLATED GROUPSBiometrika, 1957
- The Multiplicative ProcessThe Annals of Mathematical Statistics, 1949
- On the Generalized "Birth-and-Death" ProcessThe Annals of Mathematical Statistics, 1948
- The Spread of an EpidemicProceedings of the National Academy of Sciences, 1945