Viral infection dynamics with immune chemokines and CTL mobility modulated by the infected cell density.

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2024-03-15 DOI:10.1007/s00285-024-02065-0
Hongying Shu, Hai-Yang Jin, Xiang-Sheng Wang, Jianhong Wu
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Abstract

We study a viral infection model incorporating both cell-to-cell infection and immune chemokines. Based on experimental results in the literature, we make a standing assumption that the cytotoxic T lymphocytes (CTL) will move toward the location with more infected cells, while the diffusion rate of CTL is a decreasing function of the density of infected cells. We first establish the global existence and ultimate boundedness of the solution via a priori energy estimates. We then define the basic reproduction number of viral infection R 0 and prove (by the uniform persistence theory, Lyapunov function technique and LaSalle invariance principle) that the infection-free steady state E 0 is globally asymptotically stable if R 0 < 1 . When R 0 > 1 , then E 0 becomes unstable, and another basic reproduction number of CTL response R 1 becomes the dynamic threshold in the sense that if R 1 < 1 , then the CTL-inactivated steady state E 1 is globally asymptotically stable; and if R 1 > 1 , then the immune response is uniform persistent and, under an additional technical condition the CTL-activated steady state E 2 is globally asymptotically stable. To establish the global stability results, we need to prove point dissipativity, obtain uniform persistence, construct suitable Lyapunov functions, and apply the LaSalle invariance principle.

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病毒感染动态与免疫趋化因子以及受感染细胞密度调节的 CTL 流动性。
我们研究了一个包含细胞间感染和免疫趋化因子的病毒感染模型。根据文献中的实验结果,我们提出了一个常设假设,即细胞毒性 T 淋巴细胞(CTL)会向感染细胞较多的地方移动,而 CTL 的扩散率是感染细胞密度的递减函数。我们首先通过先验能量估计建立了解的全局存在性和最终有界性。然后,我们定义了病毒感染的基本繁殖数 R 0,并通过均匀持久性理论、Lyapunov 函数技术和拉萨尔不变性原理证明,如果 R 0 1,无感染稳态 E 0 是全局渐近稳定的。当 R 0 > 1 时,E 0 变得不稳定,而 CTL 反应的另一个基本繁殖数 R 1 成为动态阈值,即如果 R 1 1,则 CTL 失活稳态 E 1 是全局渐近稳定的;如果 R 1 > 1,则免疫反应是均匀持久的,并且在附加技术条件下,CTL 激活稳态 E 2 是全局渐近稳定的。要建立全局稳定性结果,我们需要证明点消散性,获得均匀持久性,构建合适的 Lyapunov 函数,并应用拉萨尔不变性原理。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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