具有交叉扩散的种群模型周期解的不稳定性

IF 1.8 3区 数学 Q1 MATHEMATICS
Weiyu Li, Hongyan Wang
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引用次数: 0

摘要

摘要研究了一类具有猎物避难所和Holling型Ⅲ自扩散和交叉扩散的函数响应的种群模型,研究了其Hopf分岔周期解的图灵模式形成问题。首先,讨论了常微分方程模型周期解的稳定性,推导了扰动模型周期函数的一阶导数公式。其次,应用Floquet理论,给出了Hopf分岔周期解处出现图灵模式的条件。此外,我们确定了扩散种群模型在稳定周期解处形成图灵模式的交叉扩散系数范围。最后,对本文的研究进行总结,并对相关结论进行数值模拟。</p></abstract>
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The instability of periodic solutions for a population model with cross-diffusion

This paper is concerned with a population model with prey refuge and a Holling type Ⅲ functional response in the presence of self-diffusion and cross-diffusion, and its Turing pattern formation problem of Hopf bifurcating periodic solutions was studied. First, we discussed the stability of periodic solutions for the ordinary differential equation model, and derived the first derivative formula of periodic functions for the perturbed model. Second, applying the Floquet theory, we gave the conditions of Turing patterns occurring at Hopf bifurcating periodic solutions. Additionally, we determined the range of cross-diffusion coefficients for the diffusive population model to form Turing patterns at the stable periodic solutions. Finally, our research was summarized and the relevant conclusions were simulated numerically.

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来源期刊
AIMS Mathematics
AIMS Mathematics Mathematics-General Mathematics
CiteScore
3.40
自引率
13.60%
发文量
769
审稿时长
90 days
期刊介绍: AIMS Mathematics is an international Open Access journal devoted to publishing peer-reviewed, high quality, original papers in all fields of mathematics. We publish the following article types: original research articles, reviews, editorials, letters, and conference reports.
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