Center manifold analysis and Hopf bifurcation of within-host virus model

سال انتشار: 1397
نوع سند: مقاله ژورنالی
زبان: انگلیسی
مشاهده: 264

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شناسه ملی سند علمی:

JR_CMDE-6-3_001

تاریخ نمایه سازی: 15 بهمن 1401

چکیده مقاله:

A mathematical model of a within-host viral infection is presented. A local stability analysis of the model is conducted in two ways. At first, the basic reproduction number of the system is calculated. It is shown that when the reproduction number falls below unity, the disease free equilibrium (DFE) is globally asymptotically stable, and when it exceeds unity, the DFE is unstable and there exists a unique infectious equilibrium which may or may not be stable. In the case of instability, there exists an asymptotically stable periodic solution. Secondly, an analysis of local center manifold shows that when R۰ = ۱, a transcritical bifurcation occurs where upon increasing R۰ greater than one the DFE loses stability and a locally asymptotically positive infection equilibrium appears.

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نویسندگان

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Department of Applied Mathematics, Faculty of Mathematics, K. N. Toosi University of Technology, P. O. Box: ۱۶۳۱۵-۱۶۱۸, Tehran, Iran

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Department of Applied Mathematics, Faculty of Mathematics, K. N. Toosi University of Technology, P. O. Box: ۱۶۳۱۵-۱۶۱۸, Tehran, Iran

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Department of Mathematics, University of Garmsar, P. O. Box: ۳۵۸۱۷۵۵۷۹۶, Garmsar, Iran

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Department of Virology, School of Medicine, Iran University of Medical Sciences, Tehran, Iran