Surveys in Mathematics and its Applications

ISSN 1842-6298 (electronic), 1843-7265 (print)
Volume 12 (2017), 165 -- 178

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This work is licensed under a Creative Commons Attribution 4.0 International License.


S. K. Sahani, A. Islam and M. H. A. Biswas

Abstract. The most urgent public health problem today is to devise effective strategies to minimize the destruction caused by the AIDS epidemic. The understanding of HIV infection through mathematical modeling have made a significant contribution. The interaction of host to pathogen have been determined by fitting mathematical models to experimental data. In Bangladesh, the increasing rate of HIV infection comparing to the other countries of the world is not so high. Among the most at risk population of Bangladesh the HIV prevalent is still considered to be low with prevalence <1%. A AND HAVE REPRODUCTION SITUATION SHOWN DISCUSSED. R0 and shown the local and global stability at disease free and chronic infected equilibrium points. Also we have shown that if the basic reproduction number R0≤1, then HIV infection is cleared from T cell population and it converges to disease free equilibrium point. Whereas if R0>1 then HIV infection persists.

2010 Mathematics Subject Classification: 97M60; 92B05; 34G20; 34A60.
Keywords: CD4+ T cells; dynamical systems; basic reproduction number; equilibrium points; stability analysis.

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S. K. Sahani
Mathematics Discipline, Khulna University, Khulna-9208, Bangladesh.

A. Islam
Mathematics Discipline, Khulna University, Khulna-9208, Bangladesh.

M. H. A. Biswas (Corresponding author)
Mathematics Discipline, Khulna University, Khulna-9208, Bangladesh.