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Closed-form probability distribution of number of infections at a given time in a stochastic SIS epidemic model

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  • Closed-form probability distribution of number of infections at a given time in a stochastic SIS epidemic model


    Heliyon. 2019 Sep 23;5(9):e02499. doi: 10.1016/j.heliyon.2019.e02499. eCollection 2019 Sep. Closed-form probability distribution of number of infections at a given time in a stochastic SIS epidemic model.

    Otunuga OM1.
    Author information

    1 Department of Mathematics, Marshall University, One John Marshall Drive, Huntington, WV, USA.

    Abstract

    We study the effects of external fluctuations in the transmission rate of certain diseases and how these affect the distribution of the number of infected individuals over time. To do this, we introduce random noise in the transmission rate in a deterministic SIS model and study how the number of infections changes over time. The objective of this work is to derive and analyze the closed form probability distribution of the number of infections at a given time in the resulting stochastic SIS epidemic model. Using the Fokker-Planck equation, we reduce the differential equation governing the number of infections to a generalized Laguerre differential equation. The properties of the distribution, together with the effect of noise intensity, are analyzed. The distribution is demonstrated using parameter values relevant to the transmission dynamics of influenza in the United States.
    Published by Elsevier Ltd.


    KEYWORDS:

    Applied mathematics; Differential equation; Epidemic model; Epidemiology; Fokker-Planck; Infection; Kummer; Laguerre; Stochastic model

    PMID: 31687591 PMCID: PMC6819802 DOI: 10.1016/j.heliyon.2019.e02499
    Free PMC Article

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