期刊
ALEXANDRIA ENGINEERING JOURNAL
卷 60, 期 1, 页码 995-1000出版社
ELSEVIER
DOI: 10.1016/j.aej.2020.10.026
关键词
HIV; Continuous investigation; OVIM; The system of differential equations; Residual error
资金
- King Saud University, Riyadh, Saudi Arabia [RSP-2020/158]
This article discusses the modification and application of mathematical models related to HIV in order to predict the spread of the virus in a broader domain, along with providing residual errors and graphical results for the solution of the nonlinear system of differential equations.
All over the world, people are facing the challenge of HIV as it affects the person suffering from it, the communities and the economy of society also. A lot of work has been done on different aspects of this dangerous disease by many researchers. Our task in this work is to lighten the ignorant aspect of this disease and to provide a continuous future prediction for the spread of this virus on a larger domain. For this purpose, a modification has been done in the mathematical model of HIV CD4 + T-cells. And a semi-analytical technique has been applied on the system of nonlinear differential equations, governing the human immunodeficiency virus i-e HIV infection, of CD4 + T-cells, to get convergent and continuous solutions. Graphical results and residual error for the solution of the nonlinear system of differential equations are also given. (C) 2020 The Authors. Published by Elsevier B.V. on behalf of Faculty of Engineering, Alexandria University.
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