| 基于滑动式算法的IGS精密星历内插与拟合精度 |
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| 引用本文: | 吴伟,任超,王文杰,黄征凯.基于滑动式算法的IGS精密星历内插与拟合精度[J].地理空间信息,2013,11(2):69-70,73. |
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| 作者姓名: | 吴伟 任超 王文杰 黄征凯 |
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| 作者单位: | 1. 中国水电顾问集团贵阳勘测设计研究院,贵州贵阳,550081
2. 桂林理工大学测绘地理信息学院,广西桂林541004;桂林理工大学广西空间信息与测绘重点实验室,广西桂林541004 |
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| 基金项目: | 国家自然科学基金资助项目,广西自然科学基金资助项目,广西科学基金资助项目 |
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| 摘 要: | 从Lagrange和Chebyshev多项式插值余项误差方面分析了进行滑动式插值的必要性,并通过具体算例得出结论 :2种模型最佳插值结果精度相当,阶数选择恰当,可达亚mm级;随着插值阶数增加,Chebyshev拟合偏差成级数增加,而Lagrange内插精度降低不明显;采用非滑动式算法,Lagrange偏差可达m级,Chebyshev精度相对稳定,达cm级。
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| 关 键 词: | 滑动式算法 Lagrange内插 Chebyshev拟合 误差估计 |
Analysis of IGS Ephemeris Interpolation and Fitting Precise Based on the Algorithm of Sleek |
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| Abstract: | This paper analyzed the necessity of sliding interpolation from the remainder error of Lagrange and Chebyshev polynomial interpolation aspects,and through the specific example obtained that the best interpolation results were equivalent accuracy of the two models.If you choose the appropriate order,sub-millimeter accuracy can be achieved.With the interpolation order increases,the Chebyshev fitting deviation into a series to increase,while the Lagrange interpolation accuracy is not significantly reduce.The deviation of nonsliding algorithm of Lagrange could achieve meter level.The deviation of non-sliding algorithm of Chebyshev could achieve centimeter level. |
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| Keywords: | the algorithm of sleek Lagrange interpolation Chebyshev fitting error estimation |
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