نویسندگان | زهره عباسی,ایمان زمانی,امیرحسین امیری مهرا,Asier Ibeas,محسن شفیعی راد |
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نشریه | COMPUT MATH METHOD M |
ضریب تاثیر (IF) | 2.238 |
نوع مقاله | Full Paper |
تاریخ انتشار | 2021 |
رتبه نشریه | علمی - پژوهشی |
نوع نشریه | الکترونیکی |
کشور محل چاپ | ایران |
نمایه نشریه | SCOPUS ,JCR |
چکیده مقاله
In this study, two types of epidemiological models called “within-host” and “between-hosts” have been studied. The within-host model represents the innate immune response, and the between-hosts model signifies the SEIR (Susceptible, Exposed, Infected, Recovered) epidemic model. The major contribution of this paper is to break the chain of infectious disease transmission by reducing the number of susceptible and infected people via transferring them to the recovered people group with vaccination and antiviral treatment, respectively. Both transfers are considered with time delay. In the first step, optimal control theory is applied to calculate the optimal final time to control the disease within a host's body with a cost function. To this end, the vaccination that represents the effort that converts healthy cells into resistant-to-infection cells in the susceptible individual’s body is used as the first control input to vaccinate the susceptible individual against the disease. Moreover, the next control input (antiviral treatment) is applied to eradicate the concentrations of the virus and convert healthy cells into resistant-to-infection cells simultaneously in the infected person’s body to treat the infected individual. The calculated optimal time in the first step is considered as the delay of vaccination and antiviral treatment in the SEIR dynamic model. Using Pontryagin’s maximum principle in the second step, an optimal control strategy is also applied to an SEIR mathematical model with a non-linear transmission rate and time delay, which is computed as optimal time in the first step. Numerical results are consistent with the analytical ones and corroborate our theoretical results.
tags: Innate Immune Response, Multi-Scale Model, Nonlinear Transmission Rate, Optimal Control , SEIR Epidemic Model, Time-Delay