Predicting population extinction or disease outbreaks with stochastic models

Linda J. S. Allen
Department of Mathematics and Statistics, Texas Tech University, Lubbock, TX, USA

Sophia R. Jang
Department of Mathematics and Statistics, Texas Tech University, Lubbock, TX, USA

Lih-Ing Roeger
Department of Mathematics and Statistics, Texas Tech University, Lubbock, TX, USA

Abstract

Models of exponential growth, logistic growth and epidemics are common applications in undergraduate differential equation courses. The corresponding stochastic models are not part of these courses, although when population sizes are small their behaviour is often more realistic and distinctly different from deterministic models. For example, the randomness associated with births and deaths may lead to population extinction even in an exponentially growing population. Some background in continuous-time Markov chains and applications to populations, epidemics and cancer are presented with a goal to introduce this topic into the undergraduate mathematics curriculum that will encourage further investigation into problems on conservation, infectious diseases and cancer therapy. MATLAB programs for graphing sample paths of stochastic models are provided in the Appendix.

Keywords: Exponential growth ,logistic growth ,continuous-time Markov chain ,SIR epidemic ,stochastic process

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