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Abstract and Applied Analysis - Volume 2014 2014, Article ID 650371, 12 pages -

Research ArticleDepartment of Mathematics, Faculty of Science, King Abdulaziz University, P.O. Box 80203, Jeddah 21589, Saudi Arabia

Received 9 December 2013; Revised 18 February 2014; Accepted 6 March 2014; Published 3 April 2014

Academic Editor: Malay Banerjee

Copyright © 2014 Mustafa A. Obaid and A. M. Elaiw. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Two virus infection models with antibody immune response and chronically infected cells are proposed and analyzed. Bilinear incidence rate is considered in the first model, while the incidence rate is given by a saturated functional response in the second one. One main feature of these models is that it includes both short-lived infected cells and chronically infected cells. The chronically infected cells produce much smaller amounts of virus than the short-lived infected cells and die at a much slower rate. Our mathematical analysis establishes that the global dynamics of the two models are determined by two threshold parameters and . By constructing Lyapunov functions and using LaSalle-s invariance principle, we have established the global asymptotic stability of all steady states of the models. We have proven that, the uninfected steady state is globally asymptoticallystable GAS if , the infected steady state without antibody immune response exists and itis GAS if , and the infected steady state with antibody immune response exists and it is GAS if . We check our theorems with numerical simulation in the end.





Autor: Mustafa A. Obaid and A. M. Elaiw

Fuente: https://www.hindawi.com/



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