包括细胞间病毒传播在内的HIV潜伏期模型的全局动力学

IF 4.6 2区 数学 Q1 MATHEMATICS, APPLIED
Wajahat Ali, Zhipeng Qiu
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引用次数: 0

摘要

艾滋病毒通过细胞间转移和释放无细胞颗粒传播。根据最近的报道,一种更有效的逆转录病毒传播方法是HIV的细胞间直接传播。不健康细胞和健康细胞之间的细胞内相互作用,结合细胞释放的细胞因子,可能影响靶静息CD4+T细胞对HIV感染的易感性和潜伏感染的形成。我们提出了一类HIV潜伏期数学模型,整合了无细胞病毒传播和直接细胞间扩散,以提高对潜伏库动力学的理解。我们在模型中纳入了四个组成部分:未感染的T细胞、潜伏感染的T细胞、活跃感染的T细胞和HIV病毒。我们通过引入基本复制数来检验延迟模型。首先建立了系统解的非负性和有界性,然后研究了系统稳态的全局稳定性。当基本繁殖数小于1时,无病平衡全局稳定,当基本繁殖数大于1时,患病平衡存在且全局稳定。执行数值模拟来解释理论结果,并通过提供估计来评估潜伏分数在病毒生产和HIV潜伏库中的相对贡献。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The Global Dynamics of HIV Latency Model Including Cell-to-Cell Viral Transmission
HIV spreads by cell-to-cell transfer and the release of cell-free particles. A slightly more effective method of retroviral transmission is the direct cell-to-cell transfer of HIV, according to recent reports. Intracellular interaction between unhealthy and healthy cells, in combination with cytokine discharged by the cells included, may affect the susceptibility of a target resting CD4+T cell to HIV infection and the formation of latent infection. We suggest a class of HIV latency mathematical model, integrating both cell-free virus transmission and direct cell-to-cell diffusion to improve the understanding of the dynamics of the latent reservoirs. We incorporate four components in our model: the uninfected T cells, the latently infected T cells, the active-infected T cells and the HIV viruses. We examine the latency model by introducing the basic reproduction number. We first establish the non-negativity and boundedness of the solutions of the system, and then we investigate the global stability of the steady states. The diseased-free equilibrium is globally stable when the basic reproduction number is less than 1 and if the basic reproduction number is greater than 1, the diseased equilibrium exists and is globally stable. Numerical simulations are executed to interpret the theoretical outcomes and evaluate the relative contribution of latency fractions in the virus production and the HIV latent reservoir by providing estimates.
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来源期刊
CiteScore
8.80
自引率
5.00%
发文量
18
审稿时长
6 months
期刊介绍: Applied and Computational Mathematics (ISSN Online: 2328-5613, ISSN Print: 2328-5605) is a prestigious journal that focuses on the field of applied and computational mathematics. It is driven by the computational revolution and places a strong emphasis on innovative applied mathematics with potential for real-world applicability and practicality. The journal caters to a broad audience of applied mathematicians and scientists who are interested in the advancement of mathematical principles and practical aspects of computational mathematics. Researchers from various disciplines can benefit from the diverse range of topics covered in ACM. To ensure the publication of high-quality content, all research articles undergo a rigorous peer review process. This process includes an initial screening by the editors and anonymous evaluation by expert reviewers. This guarantees that only the most valuable and accurate research is published in ACM.
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