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论文:2023,Vol:41,Issue(4):802-811 |
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引用本文: |
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吴焕芹, 王茂才, 宋志明, 陈晓宇. 基于椭球理论的卫星入轨位置随机误差估计方法[J]. 西北工业大学学报 |
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WU Huanqin, WANG Maocai, SONG Zhiming, CHEN Xiaoyu. A random error estimation method for satellites being launched into orbit based on ellipsoid theory[J]. Journal of Northwestern Polytechnical University |
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| 基于椭球理论的卫星入轨位置随机误差估计方法 |
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| 吴焕芹1, 王茂才1,2, 宋志明1,2, 陈晓宇1,2 |
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1. 中国地质大学(武汉) 计算机学院, 湖北 武汉 430074;
2. 中国地质大学(武汉) 智能地学信息处理湖北省重点实验室, 湖北 武汉 430074 |
| 摘要: |
| 准确快捷地估计卫星位置随机误差有利于更好地控制卫星。针对卫星入轨位置的随机误差,分析了入轨位置随机误差的概率密度函数,根据卫星入轨六根数不确定性矩阵,利用协方差阵传播率确定地心惯性坐标系下入轨位置在3个坐标轴方向的不确定性,把入轨位置等概率密度曲面近似为椭球,推导出椭球的形状、大小和方向,进而计算卫星入轨在一定空间范围内的概率。利用蒙特卡罗方法,借助STK软件模拟低轨微纳卫星在随机因素影响下发射入轨,仿真实际入轨位置分布,并对比椭球理论模型下入轨位置的概率分布。仿真结果表明椭球理论误差模型分析结果与模拟实验结果基本一致,说明该椭球理论模型可以用来估计卫星随机位置误差。 |
| 关键词:
卫星轨道
初始位置
随机误差
误差椭球
概率密度曲面
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| A random error estimation method for satellites being launched into orbit based on ellipsoid theory |
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| WU Huanqin1, WANG Maocai1,2, SONG Zhiming1,2, CHEN Xiaoyu1,2 |
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1. School of Computer Science, China University of Geosciences(Wuhan), Wuhan 430074, China;
2. Hubei Key Laboratory of Intelligent Geo-Information Processing, China University of Geosciences(Wuhan), Wuhan 430074, China |
| Abstract: |
| Accurate and fast random error estimation is essential to improve satellite control. In this paper, the random error of the satellite being launched into orbit is explored. According to the uncertainty matrix of six satellite orbit parameters associated with the project, the uncertainty of the orbit position in the three axes of the geocentric inertial frame of reference is calculated via the propagation rate of the covariance matrix. Then, the random error probability density of the satellite position is constructed for normal distribution. The surface of the error with the same probability density is approximated as an ellipsoid, the size is deduced along with the ellipsoid's shape and direction, and the satellite's spatial position probability is obtained. Monte Carlo method and STK software were employed to simulate low-earth orbit micro-nano satellite launching into the same orbital position. It is confirmed that the results obtained via the theoretical model are in line with practice. Therefore, the ellipsoid theory proposed in this paper can be used to describe the satellite random position error. |
| Key words:
satellite orbit
initial position
random error
error ellipsoid
probability density surface
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| 收稿日期: 2022-09-16
修回日期:
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| DOI: 10.1051/jnwpu/20234140802 |
| 基金项目: 国家自然科学基金面上项目(42271391)、国家自然科学基金青年项目(62006214)与湖北省重点研发专项(2023BIB015)资助 |
| 通讯作者: 王茂才(1974—),中国地质大学(武汉)教授,主要从事航天智能优化研究。e-mail:cugwangmc@126.com
Email:cugwangmc@126.com |
| 作者简介: 吴焕芹(1981—),中国地质大学(武汉)博士研究生,主要从事星群效能评估研究。
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参考文献: |
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[1] KNOGL J S, HENKEL P, GUNTHER C. Precise positioning of a geostationary data relay using LEO satellites[C]//53rd International Symposium Elmar, 2011: 325-328
[2] VIGHNESAM NV, SONNEY A, SONI P K. CARTOSAT-1 orbit determination system and achieved accuracy during early phase[C]//2007 AAS/AIAA Astrodynamics Specialist Conference, 2007: 511-522
[3] ZHOU P, DU L, LI X, et al. Near real-time BDS GEO satellite orbit determination and maneuver analysis with reversed point positioning[J]. Advances in Space Research, 2018, 63(5): 1781-1791
[4] DING Li, XUE Cheng, JIA Xiaolin, et al. Precision analysis of BDS-3 satellite orbit by using slr data[C]//China Satellite Navigation Conference 2019 Proceedings, 2019: 389-399
[5] LARKI M H A, MABOODI M, BOLANDI H. Satellite orbit determination based on gradient method[C]//Chinese Control and Decision Conference, 2012: 2554-2559
[6] 白显宗. 空间目标轨道预报误差与碰撞概率问题研究[D]. 长沙: 国防科学技术大学, 2013 BAI Xianzong. Research on orbital prediction error and collision probability of space objects[D]. Changsha: National University of Defense Technology, 2013 (in Chinese)
[7] 贺若飞, 田雪涛, 刘宏娟, 等. 基于蒙特卡罗卡尔曼滤波的无人机目标定位方法[J]. 西北工业大学学报, 2017, 35(3): 435-441 HE Ruofei, TIAN Xuetao, LIU Hongjuan, et al. A UAV target localization approach based on Monte-Carlo Kalman filter[J]. Journal of Northwestern Polytechnical University, 2017, 35(3): 435-441 (in Chinese)
[8] 阎海峰, 魏文辉, 冯志华, 等. 伪卫星空中基站定位高性能算法研究[J]. 西北工业大学学报, 2015, 33(5): 763-769 YAN Haifeng, WEI Wenhui, FENG Zhihua, et al. Research on high-performance algorithm for pseudolite air based positioning[J]. Journal of Northwestern Polytechnical University, 2015, 33(5): 763-769 (in Chinese)
[9] CHEN Zhaoyue, LIU Li, CHEN Shulin, et al. Interval uncertainty analysis of soft-landing dynamics of lunar lander[J]. Acta Armamentarii, 2019, 40(2): 442-448
[10] 谷德峰, 易东云, 朱炬波, 等. 分布式InSAR三维定位的闭合形式解及其精度分析[J]. 电子学报, 2007(6): 1026-1031 GU Defeng, YI Dongyun, ZHU Jubo, et al. Closed-form solution of distributed InSAR geolocation and its precision analysis[J]. Acta Electronica Sinica, 2007(6): 1026-1031 (in Chinese)
[11] 郑晋军, 曹志刚. 卫星位置误差相关时的三星编队系统时差定位精度[J]. 清华大学学报, 2004(10): 1398-1401 ZHENG Jinjun, CAO Zhigang. Positioning precision of three satellite constellation using relative locations in the presence of correlated satellite positioning errors[J]. Journal of Tsinghua University, 2004(10): 1398-1401
[12] 易山. 基于不确定性的遥感卫星系统效能评估[D]. 哈尔滨: 哈尔滨工业大学, 2021 YI Shan. Effectiveness evaluation of remote sensing satellite system based on uncertainty[D]. Harbin: Harbin Institute of Technology, 2021 (in Chinese)
[13] 高辰, 杨震, 牛文龙. 基于线性回归近似替代模型的分布式卫星系统不确定性分析方法[J]. 空间科学学报, 2021, 41(6): 928-935 GAO Chen, YANG Zhen, NIU Wenlong. Linear surrogate uncertainty analysis method for distributed satellite system[J]. Chinese Journal of Space Science, 2021, 41(6): 928-935 (in Chinese)
[14] ZHANG Houle, WU Yongxin, WANG Juncheng. Analysis of stochastic errors and gaussianity of random vector process simulated by dimension-reduction representation method[J]. Applied Mathematical Modelling, 2022, 109: 283-303
[15] 杨辰. 分布式卫星系统概念设计中的不确定性参数分析方法研究[D]. 北京: 中国科学院大学, 2020 YANG Chen. Research on performance uncertainty analysis methods for distributed satellite system in conceptual design phase[D]. Beijing: China University of Science, 2020 (in Chinese)
[16] MAGGIONI V, SAPIANO M R P, ADLER R F. Estimating uncertainties in high-resolution satellite precipitation products: systematic or random error[J]. Journal of Hydrometeorology, 2016, 17(4): 1119-1129
[17] 王穗辉. 误差理论与测量平差[M]. 上海: 同济大学出版社, 2015 WANG Suihui. Error theory and basis of surveying adjustment[M]. Shanghai: Tongji University Press, 2015 (in Chinese)
[18] 唐宁, 王少萍, 洪迪峰. 井眼测量误差椭球最小间距计算方法[J]. 石油学报, 2017, 38(11): 1320-1325 TANG Ning, WANF Shaoping, HONG Difeng. A calculation method of minimum distance between wellbore survey error ellipsoid[J]. Acta Petrolei Sinica, 2017, 38(11): 1320-1325 (in Chinese) |
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