非紧位形空间和非负势能系统的可逆性

Q3 Mathematics

Pmm Journal of Applied Mathematics and Mechanics Pub Date : 2017-01-01 DOI:10.1016/j.jappmathmech.2017.12.001

V.V. Kozlov

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引用次数: 0

摘要

讨论了具有非紧位形空间的可逆机械系统的轨迹可逆性问题。为了确定具有非负势能系统的可逆性条件，使用不变的吉布斯测度。尽管存在非紧性，但整个相空间的吉布斯测度可以是有限的，这保证了几乎所有相轨迹的可逆性。给出了具有非负势能齐次系统轨迹可逆性的充分条件。由此，建立了具有三自由度的杨-米尔斯哈密顿量中几乎所有相轨迹的可逆性。

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On reversibility in systems with a non-compact configuration space and non-negative potential energy

The problem of the reversibility of the trajectories of a reversible mechanical system with a non-compact configuration space is discussed. To identify the conditions of reversibility in systems with a non-negative potential energy, an invariant Gibbs measure is used. Despite the non-compactness, the Gibbs measure of the entire phase space can be finite, which guarantees reversibility of almost all phase trajectories. Sufficient conditions for reversibility of trajectories of systems with a homogeneous, non-negative potential energy are indicated. As a consequence, reversibility of almost all phase trajectories of the Yang–Mills Hamiltonian with three degrees of freedom is established.

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来源期刊

Pmm Journal of Applied Mathematics and Mechanics 物理-力学

CiteScore

0.70

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： This journal is a cover to cover translation of the Russian journal Prikladnaya Matematika i Mekhanika, published by the Russian Academy of Sciences and reflecting all the major achievements of the Russian School of Mechanics.The journal is concerned with high-level mathematical investigations of modern physical and mechanical problems and reports current progress in this field. Special emphasis is placed on aeronautics and space science and such subjects as continuum mechanics, theory of elasticity, and mathematics of space flight guidance and control.