球面上的三体问题及其反转对称性

IF 2.7 3区数学 Q1 MATHEMATICS, APPLIED

Physica D: Nonlinear Phenomena Pub Date : 2025-05-08 DOI:10.1016/j.physd.2025.134707

Abimael Bengochea, Ernesto Pérez-Chavela, Carlos Barrera-Anzaldo

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引用次数: 0

摘要

在这项工作中，我们在球面上的三体问题中建立了反转对称的概念，这是一种以前没有探索过的新方法。我们引入了三种可逆对称：一种对任意质量有效，另两种需要两个相等的质量。我们还提供了它们的不动点的全面表征，由于它们与系统的对称周期轨道的联系，这对于理解系统的动力学至关重要。利用两种反向对称，对球面上的三体问题的编排进行了数值计算，球面是一种特殊的对称周期轨道。这个轨道与经典的8字形编排密切相关，8字形编排是牛顿平面三体问题中著名的对称周期轨道。

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The three-body problem on the sphere and its reversing symmetries

In this work, we establish the concept of reversing symmetry in the three-body problem on the sphere, a novel approach that has not been previously explored. We introduce three reversing symmetries: one valid for arbitrary masses, and two that require two equal masses. We also provide a thorough characterization of their fixed points, which are crucial for understanding the dynamics of the system due to their connection with the symmetric periodic orbits of the system. Using two reversing symmetries, we numerically compute a choreography in the three-body problem on the sphere, a particular type of symmetric periodic orbit. This orbit is closely related to the classical figure-eight choreography, a well-known symmetric periodic orbit in the Newtonian planar three-body problem.

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来源期刊

Physica D: Nonlinear Phenomena 物理-物理：数学物理

CiteScore

7.30

自引率

7.50%

发文量

213

审稿时长

65 days

期刊介绍： Physica D (Nonlinear Phenomena) publishes research and review articles reporting on experimental and theoretical works, techniques and ideas that advance the understanding of nonlinear phenomena. Topics encompass wave motion in physical, chemical and biological systems; physical or biological phenomena governed by nonlinear field equations, including hydrodynamics and turbulence; pattern formation and cooperative phenomena; instability, bifurcations, chaos, and space-time disorder; integrable/Hamiltonian systems; asymptotic analysis and, more generally, mathematical methods for nonlinear systems.