Conic Nonholonomic Constraints on Surfaces and Control Systems

IF 0.6 4区数学 Q4 AUTOMATION & CONTROL SYSTEMS

Journal of Dynamical and Control Systems Pub Date : 2023-09-29 DOI:10.1007/s10883-023-09659-9

Timothée Schmoderer, Witold Respondek

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引用次数: 3

Abstract

This paper addresses the equivalence problem of conic submanifolds in the tangent bundle of a smooth 2-dimensional manifold. Those are given by a quadratic relation between the velocities and are treated as nonholonomic constraints whose admissible curves are trajectories of the corresponding control systems, called quadratic systems. We deal with the problem of characterising and classifying conic submanifolds under the prism of feedback equivalence of control systems, both control-affine and fully nonlinear. The first main result of this work is a complete description of non-degenerate conic submanifolds via a characterisation under feedback transformations of the novel class of quadratic control-affine systems. This characterisation can explicitly be tested on structure functions defined for any control-affine system and gives a normal form of quadratisable systems and of conic submanifolds. Then, we consider the classification problem of regular conic submanifolds (ellipses, hyperbolas, and parabolas), which is treated via feedback classification of quadratic control-nonlinear systems. Our classification includes several normal forms of quadratic systems (in particular, normal forms not containing functional parameters as well as those containing neither functional nor real parameters) and, as a consequence, gives a classification of regular conic submanifolds.

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曲面的二次非完整约束与控制系统

研究光滑二维流形切线束中二次子流形的等价性问题。它们由速度之间的二次关系给出，并被视为非完整约束，其允许曲线是相应控制系统的轨迹，称为二次系统。在控制仿射和全非线性控制系统的反馈等价棱镜下，研究了二次子流形的表征和分类问题。本工作的第一个主要结果是通过对一类新的二次控制仿射系统在反馈变换下的表征，完整地描述了非退化二次子流形。这一特征可以在任何控制仿射系统定义的结构函数上显式地检验，并给出了可积系统和二次子流形的正规形式。然后，我们考虑正则圆锥子流形(椭圆、双曲线和抛物线)的分类问题，并通过二次控制非线性系统的反馈分类来处理。我们的分类包括二次系统的几种正规形式(特别是不包含泛函参数的正规形式以及既不包含泛函参数也不包含实参数的正规形式)，并因此给出了正则二次子流形的分类。

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

Journal of Dynamical and Control Systems 工程技术-应用数学

CiteScore

1.70

自引率

11.10%

发文量

审稿时长

>12 weeks

期刊介绍： Journal of Dynamical and Control Systems presents peer-reviewed survey and original research articles which examine the entire spectrum of issues related to dynamical systems, focusing on the theory of smooth dynamical systems with analyses of measure-theoretical, topological, and bifurcational aspects. The journal covers all essential branches of the theory - local, semilocal, and global - including the theory of foliations. Control systems coverage spotlights the geometric control theory, which unifies Lie-algebraic and differential-geometric methods of investigation in control and optimization, and ultimately relates to the general theory of dynamical systems, in particular, sub-Riemannian geometry is covered. Additional authoritative contributions describe ongoing investigations and innovative solutions to unsolved problems. Detailed reviews of newly published books relevant to future studies in the field are also included. Journal of Dynamical and Control Systems will serve as a highly useful reference for mathematicians, students, and researchers interested in the many facets of dynamical and control systems.