Research article

A stochastic epidemic model of COVID-19 disease

  • Received: 15 July 2020 Accepted: 25 August 2020 Published: 26 September 2020
  • MSC : 92D30, 60J10, 60H10

  • To model the evolution of diseases with extended latency periods and the presence of asymptomatic patients like COVID-19, we define a simple discrete time stochastic SIR-type epidemic model. We include both latent periods as well as the presence of quarantine areas, to capture the evolutionary dynamics of such diseases.

    Citation: Xavier Bardina, Marco Ferrante, Carles Rovira. A stochastic epidemic model of COVID-19 disease[J]. AIMS Mathematics, 2020, 5(6): 7661-7677. doi: 10.3934/math.2020490

    Related Papers:

  • To model the evolution of diseases with extended latency periods and the presence of asymptomatic patients like COVID-19, we define a simple discrete time stochastic SIR-type epidemic model. We include both latent periods as well as the presence of quarantine areas, to capture the evolutionary dynamics of such diseases.


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    [1] L. J. S. Allen, An introduction to stochastic processes with applications to biology, Prentice-Hall, Englewood Cliffs, 2003.
    [2] R. M. Anderson, R. M. May, Infectious Diseases of Humans. Dynamics and Control, Oxford University Press, Oxford, 1991.
    [3] N. T. Bailey, The mathematical theory of infectious diseases and its applications, Charles Griffin company limited, London, 1975.
    [4] D. J. Daley, J. Gani, Epidemic modelling: an introduction, Cambridge University Press, Cambridge, 1999.
    [5] O. Diekmann, H. Heesterbeek, T. Britton, Mathematical tools for understanding infectious disease dynamics, Princeton University Press, Princeton, 2013.
    [6] W. Kermack, A. McKendrick, A contribution to the mathematical theory of epidemics, Proceedings of the Royal Society of London, 115 (1927), 700-721.
    [7] C. McCluskey, Global stability for an SEIR epidemiological model with varying infectivity and infinite delay, Math. Biosci. Eng., 6 (2009), 603-610.
    [8] G. Huang, Y. Takeuchi, W. Ma, et al., Global stability for delay SIR and SEIR epidemic models with nonlinear incidence rate, B. Math. Biol., 72 (2010), 1192-1207.
    [9] H. C. Tuckwell, R. J. Williams, Some properties of a simple stochastic epidemic model of SIR type, Math. Biosci., 208 (2007), 76-97.
    [10] M. K. Oli, M. Venkataraman, P. A. Klein, et al., Population dynamics of infectious diseases: A discrete time model, Ecol. Model., 198 (2006), 183-194.
    [11] C. Mode, C. Sleeman, Stochastic processes in epidemiology: HIV/AIDS, other infectious diseases and computers, World Sci., Singapore, 2000.
    [12] D. S. Hui, E. Azhar, T. A. Madani, et al., The continuing 2019-nCoV epidemic threat of novel coronaviruses to global health? The latest 2019 novel coronavirus outbreak in Wuhan, China, Int. J. Infect. Dis., 91 (2020), 264-266.
    [13] J. T. Wu, K. Leung and G. M. Leung, Nowcasting and forecasting the potential domestic and international spread of the 2019-nCoV outbreak originating in Wuhan, China: a modelling study, The Lancet., 395 (2020), 689-697.
    [14] E. Lavezzo, E. Franchin, C. Ciavarella, et al., Suppression of a SARS-CoV-2 outbreak in the Italian municipality of Vo', Nature, 584 (2020), 425-429.
    [15] M. Ferrante, E. Ferraris, C. Rovira, On a stochastic epidemic SEIHR model and its diffusion approximation, Test, 25 (2016), 482-502.
    [16] S. He, Y. Peng, K. Sun, SEIR modeling of the COVID-19 and its dynamics, Nonlinear Dyn., (2020), 1-14.
    [17] O. Diekmann, J. A. P. Heesterbeek, J. A. J. Metz, On the definition and the computation of the basic reproduction ratio R0 in models for infectious diseases in heterogeneous populations, J. Math. Biol., 28 (1990), 365-382.
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  • © 2020 the Author(s), licensee AIMS Press. This is an open access article distributed under the terms of the Creative Commons Attribution License (http://creativecommons.org/licenses/by/4.0)
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