Lipschitz Carnot-Carathéodory Structures and their Limits.

IF 0.6 4区数学 Q4 AUTOMATION & CONTROL SYSTEMS

Journal of Dynamical and Control Systems Pub Date : 2023-01-01 Epub Date: 2022-11-25 DOI:10.1007/s10883-022-09613-1

Gioacchino Antonelli, Enrico Le Donne, Sebastiano Nicolussi Golo

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引用次数: 4

Abstract

In this paper we discuss the convergence of distances associated to converging structures of Lipschitz vector fields and continuously varying norms on a smooth manifold. We prove that, under a mild controllability assumption on the limit vector-fields structure, the distances associated to equi-Lipschitz vector-fields structures that converge uniformly on compact subsets, and to norms that converge uniformly on compact subsets, converge locally uniformly to the limit Carnot-Carathéodory distance. In the case in which the limit distance is boundedly compact, we show that the convergence of the distances is uniform on compact sets. We show an example in which the limit distance is not boundedly compact and the convergence is not uniform on compact sets. We discuss several examples in which our convergence result can be applied. Among them, we prove a subFinsler Mitchell's Theorem with continuously varying norms, and a general convergence result for Carnot-Carathéodory distances associated to subspaces and norms on the Lie algebra of a connected Lie group.

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Lipschitz Carnot Carathéodory结构及其极限。

本文讨论了光滑流形上与Lipschitz向量场的收敛结构和连续变范数有关的距离的收敛性。我们证明，在极限向量场结构的温和可控性假设下，与在紧子集上一致收敛的等Lipschitz向量场结构和与在紧子集中一致收敛的范数相关的距离，局部一致收敛到极限Carnot-Carathéodory距离。在极限距离是有界紧致的情况下，我们证明了距离在紧致集上的收敛是一致的。我们给出了一个例子，其中极限距离不是有界紧致的，并且在紧致集上收敛性是不一致的。我们讨论了几个例子，其中我们的收敛结果可以应用。其中，我们证明了具有连续变范数的子Finsler-Mitchell定理，以及连通李群李代数上与子空间和范数相关的Carnot-Carathéodory距离的一般收敛结果。

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

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.