Mathematics Interdisciplinary Research (Jun 2024)
Fractional Dynamics of Infectious Disease Transmission with Optimal Control
Abstract
This article investigates and studies the dynamics of infectious disease transmission using a fractional mathematical model based on Caputo fractional derivatives. Consequently, the population studied has been divided into four categories: susceptible, exposed, infected, and recovered. The basic reproduction rate, existence, and uniqueness of disease-free as well as infected steady-state equilibrium points of the mathematical model have been investigated in this study. The local and global stability of both equilibrium points has been investigated and proven by Lyapunov functions. Vaccination and drug therapy are two controllers that may be used to control the spread of diseases in society, and the conditions for the optimal use of these two controllers have been prescribed by the principle of Pontryagin's maximum. The stated theoretical results have been investigated using numerical simulation. The numerical simulation of the fractional optimal control problem indicates that vaccination of the susceptible subjects in the community reduceshorizontal transmission while applying drug control to the infected subjects reduces vertical transmission. Furthermore, the simultaneous use of both controllers is much more effective and leads to a rapid increase in the cured population and it prevents the disease from spreading and turning into an epidemic in the community.
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