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首页> 外文期刊>International journal of bifurcation and chaos in applied sciences and engineering >A Framework for Constructing Transfers Linking Periodic Libration Point Orbits in the Spatial Circular Restricted Three-Body Problem
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A Framework for Constructing Transfers Linking Periodic Libration Point Orbits in the Spatial Circular Restricted Three-Body Problem

机译:空间圆受限三体问题中构造链接周期性周期点轨道的传递的框架

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The Earth-Moon libration points are of interest for future missions and have been proposed for both storage of propellant and supplies for lunar missions and as locations to establish space-based facilities for human missions. Thus, further development of an available transport network in the vicinity of the Moon is valuable. In this investigation, a methodology to search for transfers between periodic lunar libration point orbits is developed, and a catalog of these transfers is established, assuming the dynamics associated with the Earth-Moon circular restricted three-body problem. Maneuver-free transfers, i.e. heteroclinic and homoclinic connections, are considered, as well as transfers that require relatively small levels of Delta v. Considering the evolution of Earth-Moon transfers as the mass parameter is reduced, a relationship emerges between the available transfers in the Earth-Moon system and maneuver-free transfers that exist within the Hill three-body problem. The correlation between transfers in these systems is examined and offers insight into the existence of solutions within the catalog. To demonstrate the persistence of the catalog transfers in a higher-fidelity model, several solutions are transitioned to a Sun-Earth-Moon ephemeris model with the inclusion of solar radiation pressure and lunar gravity harmonics. The defining characteristics are preserved in the high-fidelity model, validating both the techniques employed for this investigation and the solutions computed within the catalog.
机译:地球-月球解放点是未来任务所需要的,并已建议用于存储月球任务的推进剂和补给品,以及为人类任务建立天基设施的场所。因此,进一步发展月球附近的可用运输网络是很有价值的。在这项研究中,开发了一种搜索周期性月球解放点轨道之间的转移的方法,并建立了这些转移的目录,并假设了与月球圆形受限三体问题相关的动力学。考虑了无机动转移,即异斜度和同斜度的连接,以及需要相对较小水平的Delta v的转移。考虑到质量参数减小时地月转移的演变,因此可用的转移之间存在关系。希尔三体问题中存在的地球-月球系统和无机动转移。检查了这些系统中的转移之间的相关性,并提供了对目录中解决方案存在的了解。为了证明目录传输在高保真模型中的持久性,将几种解决方案转换为包含太阳辐射压力和月球重力谐波的太阳-地球-月亮星历模型。定义特征保留在高保真模型中,从而验证了用于此研究的技术以及目录中计算出的解决方案。

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