随机扰动下反应扩散系统模式的模态分析

IF 0.3 Q4 MATHEMATICS
A. Kolinichenko, L. Ryashko
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引用次数: 6

摘要

本文研究了一类具有扩散的分布Brusselator模型。众所周知,这个模型同时经历了Andronov-Hopf和Turing分岔。结果表明,在扩散不稳定的参数区,模型产生了多种稳定的空间非均匀结构(模式)。该系统表现出稳定空间结构多样性的多稳性现象。同时,每种模式都有其独特的参数范围,可以在该范围上观察到它。重点是分析由小的随机扰动引起的模式形成和转变的随机现象。通过空间模态分析研究了随机效应。结果表明,结构具有不同程度的随机敏感性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Modality analysis of patterns in reaction-diffusion systems with random perturbations
In this paper, a distributed Brusselator model with diffusion is investigated. It is well known that this model undergoes both Andronov-Hopf and Turing bifurcations. It is shown that in the parametric zone of diffusion instability the model generates a variety of stable spatially nonhomogeneous structures (patterns). This system exhibits a phenomenon of the multistability with the diversity of stable spatial structures. At the same time, each pattern has its unique parametric range, on which it may be observed. The focus is on analysis of stochastic phenomena of pattern formation and transitions induced by small random perturbations. Stochastic effects are studied by the spatial modality analysis. It is shown that the structures possess different degrees of stochastic sensitivity.
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