Asymptotic and stability analysis of solutions for a Keller Segel chemotaxis model

Kai Qu, Chanjie Li, Feiyu Zhang
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Abstract

A kind of Keller Segel chemotaxis model has a wide range of applications, but its coupling relationship is very complex. The commonly used method of constructing the upper and lower solutions is no longer suitable for the model solution, which results in a long time for its analysis. In this paper, we propose a method to analyze the asymptotic behavior and stability of a Keller Segel chemotaxis model. The previous methods of first formally and then rigorously, the asymptotic expansion of these monotone steady states, and then we use this fine information on the spike to prove its local asymptotic stability. Moreover, we obtain the uniqueness of such steady states. The asymptotic behavior of the solution of a Keller Segel chemotaxis model is analyzed, and the asymptotic rate is calculated; According to the limitation of Neumann boundary condition, the complete blow up of chemotaxis model solution and the stability of the initial value of the complete blow up time are studied, and the asymptotic and stability analysis of a kind of Keller Segel chemotaxis model solution is completed. The experimental results show that the proposed method takes less time to solve a kind of Keller Segel chemotaxis model, improves the efficiency of the solution, and the accuracy of the solution is higher.
一类Keller Segel趋化性模型解的渐近性和稳定性分析
一类Keller Segel趋化性模型应用广泛,但其耦合关系非常复杂。常用的构造上解和下解的方法已不适用于模型解,导致分析时间较长。本文提出了一种分析Keller Segel趋化性模型的渐近行为和稳定性的方法。前面的方法先形式化地然后严格地,得到了这些单调稳态的渐近展开式,然后我们利用这些精细信息在尖峰上证明了它的局部渐近稳定性。此外,我们还得到了这种稳态的唯一性。分析了一类Keller Segel趋化模型解的渐近性质,并计算了渐近速率;根据Neumann边界条件的限制,研究了趋化性模型解的完全爆破和完全爆破时间初值的稳定性,完成了一类Keller Segel趋化性模型解的渐近性和稳定性分析。实验结果表明,该方法求解一类Keller Segel趋化性模型所需的时间更短,提高了求解效率,求解精度更高。
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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