Department of Mathematics and Computer Science, Faculty of Sciences Ben M’sik, Hassan II University, P.O. Box 7955, Sidi Othman, Casablanca, Morocco
Abstract
In this paper, we investigate a mathematical model which takes account the cure of infected cells and the loss of viral particles due to the absorption into uninfected cells. The global stability of the model is determined by using the direct Lyapunov method for disease-free equilibrium, and the geometrical approach for chronic infection equilibrium
Hattaf, K., & Yousfi, N. (2014). Global stability of a virus dynamics model with cure rate and absorption. Journal of the Egyptian Mathematical Society, 22(3), 386-389.
MLA
Khalid Hattaf; Noura Yousfi. "Global stability of a virus dynamics model with cure rate and absorption", Journal of the Egyptian Mathematical Society, 22, 3, 2014, 386-389.
HARVARD
Hattaf, K., Yousfi, N. (2014). 'Global stability of a virus dynamics model with cure rate and absorption', Journal of the Egyptian Mathematical Society, 22(3), pp. 386-389.
VANCOUVER
Hattaf, K., Yousfi, N. Global stability of a virus dynamics model with cure rate and absorption. Journal of the Egyptian Mathematical Society, 2014; 22(3): 386-389.
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