具有两个时滞的HIV感染模型的分岔与稳定性分析

S. Ma
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引用次数: 0

摘要

HIV问题是通过延迟数学模型的版本来研究的,该模型考虑了与感染的T细胞大体积培养的未感染的CD4+T细胞的凋亡。机会感染和未感染CD4+T细胞的凋亡是由HIV基因产生的有毒物质直接或间接引起的。普遍地,非线性发病率导致CD4+T细胞感染数量的增加,并引入了小的时间延迟,此外,在病毒复制过程中也存在自然的时间延迟因素。在时滞状态反馈控制下,通过Hopf分岔引入了分岔周期振荡现象。在数学上,将几何准则应用于时滞模型的稳定性分析,导出了满足横向条件的多时滞微分方程Hopf分岔的临界阈值。应用降维方法,结合中心流形理论,利用Hopf点附近的摄动,分析了分岔周期解的稳定性。
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Bifurcation and Stability Analysis of HIV Infectious Model with Two Time Delays
The HIV problem is studied by version of delay mathematical models which consider the apoptosis of uninfected CD4+ T cells which cultured with infected T cells in big volume. The opportunistic infection and the apoptosis of uninfected CD4+ T cells are caused directly or indirectly by a toxic substance produced from HIV genes. Ubiquitously, the nonlinear incidence rate brings forth the increasing number of infected CD4+ T cells with introduction of small time delay, and in addition, there also exists a natural time delay factor during the process of virus replication. With state feedback control of time delay, the bifurcating periodical oscillating phenomena is induced via Hopf bifurcation. Mathematically, with the geometrical criterion applied in the stability analysis of delay model, the critical threshold of Hopf bifurcation in multiple delay differential equations which satisfy the transversal condition is derived. By applying reduction dimensional method combined with the center manifold theory, the stability of the bifurcating periodical solution is analyzed by the perturbation near Hopf point.
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