A survey on constructing Lyapunov functions for reaction-diffusion systems with delay and their application in biology

Q3 Mathematics
F. Najm, R. Yafia, M. A. Aziz Alaoui, A. Aghriche, A. Moussaoui
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引用次数: 0

Abstract

Motivated by some biological and ecological problems given by reaction-diffusion systems with delays and boundary conditions of Neumann type and knowing their associated Lyapunov functions for delay ordinary differential equations, we consider a method for determining their Lyapunov functions to establish the local/global stability. The method is essentially based on adding integral terms to the corresponding Lyapunov function for ordinary differential equations. The new approach is not general but it is applicable in a wide variety of delays reaction-diffusion models with one discrete delay or more, distributed delay, and a combination of both of them. To illustrate our results, we present the method application to a reaction-diffusion epidemiological model with time delay (latency period) and indirect transmission effect.
具有时滞的反应扩散系统Lyapunov函数的构造及其在生物学中的应用
摘要针对一类具有Neumann型边界条件的时滞反应扩散系统的生物和生态问题,在已知时滞常微分方程的相关Lyapunov函数的情况下,考虑了确定其Lyapunov函数的方法,从而建立了系统的局部/全局稳定性。该方法本质上是基于对常微分方程的相应Lyapunov函数添加积分项。该方法不具有通用性,但适用于具有一个或多个离散延迟、分布延迟以及两者的组合的各种延迟反应扩散模型。为了说明我们的结果,我们将该方法应用于具有时间延迟(潜伏期)和间接传播效应的反应-扩散流行病学模型。
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 Modeling and Computing
Mathematical Modeling and Computing Computer Science-Computational Theory and Mathematics
CiteScore
1.60
自引率
0.00%
发文量
54
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