用数值延拓分析模式形成

Pub Date : 2022-05-02 DOI:10.21136/AM.2022.0126-21

Vladimír Janovský

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引用次数: 0

摘要

本文讨论应用科学中的自组织问题。它特别与图灵模式的出现有关。目标是分析域大小驱动的不稳定性:我们引入参数L，它缩放域的大小。我们研究了两个物种的一维反应扩散模型。我们考虑并分析了稳态解。我们想通过数值延拓来计算分支的解。所讨论的模型具有一定的对称性。我们对它们进行定义和分类。我们的目标是计算一个全局分岔图。

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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Analysis of pattern formation using numerical continuation

The paper deals with the issue of self-organization in applied sciences. It is particularly related to the emergence of Turing patterns. The goal is to analyze the domain size driven instability: We introduce the parameter L, which scales the size of the domain. We investigate a particular reaction-diffusion model in 1-D for two species. We consider and analyze the steady-state solution. We want to compute the solution branches by numerical continuation. The model in question has certain symmetries. We define and classify them. Our goal is to calculate a global bifurcation diagram.

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