论文:2016,Vol:34,Issue(1):147-152
引用本文:
吝琳, 方群. 考虑J2项摄动的空间共振轨道特性分析[J]. 西北工业大学学报
Lin Lin, Fang Qun. Studying Spacial Resonance Orbit with J2 Perturbation Considered[J]. Northwestern polytechnical university

考虑J2项摄动的空间共振轨道特性分析
吝琳1,2, 方群1,2
1. 西北工业大学 航天学院, 陕西 西安 710072;
2. 航天飞行动力学技术国家级重点实验室, 陕西 西安 710072
摘要:
共振轨道是建立在新型坐标系下的非开普勒轨道,应用于空间机动轨道的设计,具有节省能量的优势。针对地球形状摄动J2项对共振轨道特性的影响分析问题,建立了一种新的考虑J2项摄动影响的共振轨道数学模型。通过与传统受J2项摄动影响的共振轨道数学模型的仿真对比分析可以看出,新的数学模型虽然形式较为复杂,但却能够揭示不同阶段J2项摄动使系统产生偏差的原因,比传统模型更为精确,因此更适用于工程实际中分析J2项摄动对共振轨道特性的影响。
关键词:    非开普勒运动    共振轨道    J2项摄动   
Studying Spacial Resonance Orbit with J2 Perturbation Considered
Lin Lin1,2, Fang Qun1,2
1. College of Astronautics, Northwestern Polytechnical University, Xi'an 710072, China;
2. National Laboratory of Aerospace Flight Dynamics, Xi'an 710072, China
Abstract:
The spacial resonance orbit is a non-Keplerian orbit created in a new coordinate system. It can be applied to the design of the spacial maneuvering orbit and has the advantage of saving fuel. For the spacial resonance orbit affected by J2 perturbation, a new perturbed model, applied to random inherent frequency, is developed in this paper. And then, the J2 perturbation effect on the resonance orbit characteristic is analyzed with simulation. Compared with thesimulation of the traditional perturbed model, it shows that although the new perturbed model has a more complex form, it can explain the source of differences in different stages. So it is more accurate and can analyze the J2 perturbation effect on the resonance orbit characteristic, better.
Key words:    acceleration    computer simulation    design    diffential equations    fuels    functions    maneuverability    mathematical models    mathematical transformations    matrix algebra    natural frequencies    orbits polynomicals    resonance    spacecraft    vectors    vibrations(mechanical)    J2 perturbation    non-Keplerian    resonance orbit   
收稿日期: 2015-03-17     修回日期:
DOI:
基金项目: 国家自然科学基金(11272255)资助
通讯作者:     Email:
作者简介: 吝琳(1990-),女,西北工业大学硕士研究生,主要从事飞行力学与控制的研究。
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