Chaotic behaviors and coexisting homoclinic cycles in a class of 3D piecewise systems

IF 3.7 2区 计算机科学 Q2 AUTOMATION & CONTROL SYSTEMS
Wenjing Xu , Kai Lu , Tao Zhang , Qiaomin Xiang
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引用次数: 0

Abstract

Investigating homoclinic trajectories and chaotic behaviors, is conducive to better understanding the fourteenth problem listed by Smale in his response to Arnold. This paper analytically detects coexisting homoclinic cycles without symmetry required in a class of three-dimensional (3D) piecewise systems, which is significantly different from the smooth case where a pair of homoclinic cycles with respect to one equilibrium point are generally symmetric. Moreover, it is rigorously shown that such coexisting cycles gives rise to chaos by means of analyzing a Poincaré map. An example finally is presented to illustrate the proposed results.

一类三维片状系统中的混沌行为和共存的同室循环
研究同次元轨迹和混沌行为,有助于更好地理解斯迈尔在回应阿诺德时列出的第十四个问题。本文通过分析检测了一类三维(3D)片状系统中无需对称性的共存同次循环,这与光滑情况下一对同次循环相对于一个平衡点通常是对称的有很大不同。此外,通过分析 Poincaré 地图,严格证明了这种共存循环会导致混沌。最后给出了一个例子来说明所提出的结果。
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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来源期刊
Nonlinear Analysis-Hybrid Systems
Nonlinear Analysis-Hybrid Systems AUTOMATION & CONTROL SYSTEMS-MATHEMATICS, APPLIED
CiteScore
8.30
自引率
9.50%
发文量
65
审稿时长
>12 weeks
期刊介绍: Nonlinear Analysis: Hybrid Systems welcomes all important research and expository papers in any discipline. Papers that are principally concerned with the theory of hybrid systems should contain significant results indicating relevant applications. Papers that emphasize applications should consist of important real world models and illuminating techniques. Papers that interrelate various aspects of hybrid systems will be most welcome.
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