Nonlinear adaptive stabilization of a class of planar slow-fast systems at a non-hyperbolic point

H. Jardón-Kojakhmetov, J. Scherpen, D. D. Puerto-Flores
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引用次数: 5

Abstract

Non-hyperbolic points of slow-fast systems (also known as singularly perturbed ordinary differential equations) are responsible for many interesting behavior such as relaxation oscillations, canards, mixed-mode oscillations, etc. Recently, the authors have proposed a control strategy to stabilize non-hyperbolic points of planar slow-fast systems. Such strategy is based on geometric desingularization, which is a well suited technique to analyze the dynamics of slow-fast systems near non-hyperbolic points. This technique transforms the singular perturbation problem to an equivalent regular perturbation problem. This papers treats the nonlinear adaptive stabilization problem of slow-fast systems. The novelty is that the point to be stabilized is non-hyperbolic. The controller is designed by combining geometric desingularization and Lyapunov based techniques. Through the action of the controller, we basically inject a normally hyperbolic behavior to the fast variable. Our results are exemplified on the van der Pol oscillator.
一类平面慢速系统在非双曲点处的非线性自适应镇定
慢速系统的非双曲点(也称为奇摄动常微分方程)是许多有趣行为的原因,如松弛振荡、鸭状振荡、混合模振荡等。最近,作者提出了一种稳定平面慢速系统非双曲点的控制策略。该策略基于几何去广域化,是一种非常适合于分析非双曲点附近慢速系统动力学的技术。该方法将奇异摄动问题转化为等效正则摄动问题。本文研究慢快系统的非线性自适应镇定问题。新奇之处在于待稳定点是非双曲的。该控制器采用几何去具体化和李亚普诺夫技术相结合的方法设计。通过控制器的作用,我们基本上给快速变量注入了一个正常的双曲行为。我们的结果在范德波尔振荡器上得到了举例说明。
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