非线性方程系统链中自振荡的渐近性

IF 0.8 4区 数学 Q3 MATHEMATICS, APPLIED Regular and Chaotic Dynamics Pub Date : 2024-03-11 DOI:10.1134/S1560354724010143
Sergey A. Kashchenko
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引用次数: 0

摘要

我们研究的是扩散-差分型二阶常微分方程耦合非线性系统链的局部动力学。主要假设是链的元素数量足够大。在研究平衡状态的稳定性时,我们考虑了一些关键情况,结果表明所有这些情况都具有无限维度。本文的主要成果包括抛物线类型的新非线性边界值问题,其非局部动力学描述了原始系统解的局部行为。
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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Asymptotics of Self-Oscillations in Chains of Systems of Nonlinear Equations

We study the local dynamics of chains of coupled nonlinear systems of second-order ordinary differential equations of diffusion-difference type. The main assumption is that the number of elements of chains is large enough. This condition allows us to pass to the problem with a continuous spatial variable. Critical cases have been considered while studying the stability of the equilibrum state. It is shown that all these cases have infinite dimension. The research technique is based on the development and application of special methods for construction of normal forms. Among the main results of the paper, we include the creation of new nonlinear boundary value problems of parabolic type, whose nonlocal dynamics describes the local behavior of solutions of the original system.

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来源期刊
CiteScore
2.50
自引率
7.10%
发文量
35
审稿时长
>12 weeks
期刊介绍: Regular and Chaotic Dynamics (RCD) is an international journal publishing original research papers in dynamical systems theory and its applications. Rooted in the Moscow school of mathematics and mechanics, the journal successfully combines classical problems, modern mathematical techniques and breakthroughs in the field. Regular and Chaotic Dynamics welcomes papers that establish original results, characterized by rigorous mathematical settings and proofs, and that also address practical problems. In addition to research papers, the journal publishes review articles, historical and polemical essays, and translations of works by influential scientists of past centuries, previously unavailable in English. Along with regular issues, RCD also publishes special issues devoted to particular topics and events in the world of dynamical systems.
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