A novel nonlinear dynamic model describing the spread of virus
Tarih
2023Yazar
Shakhmurov, Veli
Kurulay, Muhammet
Sahmurova, Aida
Gürsesli, Mustafa Can
Lanata, Antonio
Üst veri
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This study proposes a nonlinear mathematical model of virus transmission. The interaction
between viruses and immune cells is investigated using phase-space analysis. Specifically, the work
focuses on the dynamics and stability behavior of the mathematical model of a virus spread in a
population and its interaction with human immune system cells. The endemic equilibrium points are
found, and local stability analysis of all equilibria points of the related model is obtained. Further,
the global stability analysis, either at disease-free equilibria or in endemic equilibria, is discussed
by constructing the Lyapunov function, which shows the validity of the concern model. Finally, a
simulated solution is achieved, and the relationship between viruses and immune cells is highlighted.