哈密顿系统的部分

IF 0.8 4区数学 Q3 MATHEMATICS, APPLIED

Regular and Chaotic Dynamics Pub Date : 2021-08-09 DOI:10.1134/S156035472104002X

Konstantinos Kourliouros

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引用次数: 0

摘要

哈密顿系统的一个截面是系统相空间中的一个超曲面，通常表示一组片面约束(如边界、障碍或一组可容许状态)。本文给出正则(非奇异)哈密顿系统各部分的所有典型奇点的局部分类结果，等价于单侧约束下哈密顿系统的典型奇点分类问题。特别地，我们给出了具有泛函不变量的精确范式的完整列表，并且我们展示了这些是如何通过具有规定(惠特尼型)奇点的映射的辛分类来关联/获得的，这些奇点是在哈密顿系统的简化相空间上自然定义的。

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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Sections of Hamiltonian Systems

A section of a Hamiltonian system is a hypersurface in the phase space of the system, usually representing a set of one-sided constraints (e. g., a boundary, an obstacle or a set of admissible states). In this paper we give local classification results for all typical singularities of sections of regular (non-singular) Hamiltonian systems, a problem equivalent to the classification of typical singularities of Hamiltonian systems with one-sided constraints. In particular, we give a complete list of exact normal forms with functional invariants, and we show how these are related/obtained by the symplectic classification of mappings with prescribed (Whitney-type) singularities, naturally defined on the reduced phase space of the Hamiltonian system.

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来源期刊

Regular and Chaotic Dynamics 物理-力学

CiteScore

2.50

自引率

7.10%

发文量

审稿时长

>12 weeks

期刊介绍： Regular and Chaotic Dynamics (RCD) is an international journal publishing original research papers in dynamical systems theory and its applications. Rooted in the Moscow school of mathematics and mechanics, the journal successfully combines classical problems, modern mathematical techniques and breakthroughs in the field. Regular and Chaotic Dynamics welcomes papers that establish original results, characterized by rigorous mathematical settings and proofs, and that also address practical problems. In addition to research papers, the journal publishes review articles, historical and polemical essays, and translations of works by influential scientists of past centuries, previously unavailable in English. Along with regular issues, RCD also publishes special issues devoted to particular topics and events in the world of dynamical systems.