The Trigger Model of the Dynamics of Acute and Chronic Aseptic Inflammation

Q3 Mathematics
T.S. Mikhakhanova, O. F. Voropaeva
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引用次数: 0

Abstract

The work is devoted to the study of the qualitative properties of solutions of the mathematical model of the dynamics of aseptic inflammation and the issues of their practical application. Data are presented that indicate the potential use of the model to describe a wide range of biological processes and diseases in which aseptic inflammation is a pathogenic factor. The multistability of the dynamic system in the vicinity of biologically significant solutions and the corresponding range of parameter values is found. It is shown that, depending on the initial conditions, the model describes not only the conditional norm state (in the absence of a wound) and the classical acute inflammatory reaction to damage, but also its transition to a chronic form. The trigger mechanism of switching states of the system is investigated. The possibilities of the model as an effective tool for studying and early predicting the nature of the immune response, as well as for analyzing hypothetical therapeutic strategies that prevent the progression of acute inflammation into chronic inflammation are shown.
急性和慢性无菌性炎症动力学的触发模型
该工作致力于无菌性炎症动力学数学模型解的定性性质及其实际应用问题的研究。提出的数据表明,该模型的潜在用途来描述范围广泛的生物过程和疾病,其中无菌性炎症是一个致病因素。得到了动态系统在生物显著解和相应参数值范围附近的多稳定性。结果表明,根据初始条件,该模型不仅描述了条件规范状态(没有伤口)和经典的急性炎症反应,而且还描述了其向慢性形式的过渡。研究了系统状态切换的触发机制。该模型作为研究和早期预测免疫反应性质的有效工具的可能性,以及分析防止急性炎症进展为慢性炎症的假设治疗策略的可能性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Mathematical Biology and Bioinformatics
Mathematical Biology and Bioinformatics Mathematics-Applied Mathematics
CiteScore
1.10
自引率
0.00%
发文量
13
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