Saddle–node canard cycles in slow–fast planar piecewise linear differential systems

IF 3.7 2区 计算机科学 Q2 AUTOMATION & CONTROL SYSTEMS
V. Carmona , S. Fernández-García , A.E. Teruel
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引用次数: 0

Abstract

By applying a singular perturbation approach, canard explosions exhibited by a general family of singularly perturbed planar Piecewise Linear (PWL) differential systems are analyzed. The performed study involves both hyperbolic and non-hyperbolic canard limit cycles appearing after both, a supercritical and a subcritical Hopf bifurcation. The obtained results are comparable with those obtained for smooth vector fields. In some sense, the manuscript can be understood as an extension towards the PWL framework of the results obtained for smooth systems by Dumortier and Roussarie in Mem. Am. Math. Soc. 1996, and Krupa and Szmolyan in J. Differ. Equ. 2001. In addition, some novel slow–fast behaviors are obtained. In particular, in the supercritical case, and under suitable conditions, it is proved that the limit cycles are organized along a curve exhibiting two folds. Each of these folds corresponds to a saddle–node bifurcation of canard limit cycles, one involving headless canard cycles, and the other involving canard cycles with head. This configuration also occurs in smooth systems with N-shaped fast nullcline. However, it has not been previously reported in the Van der Pol system. Our results provide justification for this observation.

慢-快平面片断线性微分系统中的鞍节点卡纳循环
通过应用奇异扰动方法,分析了奇异扰动平面片断线性微分方程(PWL)微分方程一般族所表现出的卡式爆炸。研究涉及超临界和亚临界霍普夫分岔后出现的双曲和非双曲鸭式极限循环。所获得的结果与光滑矢量场的结果相当。从某种意义上讲,本手稿可以理解为杜莫蒂埃和鲁萨里在《美国数学会刊》(Mem. Am. Math.Math.Soc. 1996,以及 Krupa 和 Szmolyan 在 J. Differ.Equ.2001.此外,还获得了一些新的慢-快行为。特别是在超临界情况下,在合适的条件下,证明了极限循环是沿着一条表现出两个褶皱的曲线组织起来的。每个褶皱都对应于卡式极限循环的鞍节点分岔,一个涉及无头卡式循环,另一个涉及有头卡式循环。这种构型也出现在具有 N 型快速空折线的光滑系统中。然而,在范德波尔系统中,以前还没有报道过这种情况。我们的结果为这一观察提供了依据。
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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