| 法方程层面平差基准解析 |
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| 引用本文: | 王鹏,吕志平,陈正生.法方程层面平差基准解析[J].测绘工程,2010,19(3):7-9,13. |
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| 作者姓名: | 王鹏 吕志平 陈正生 |
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| 作者单位: | 信息工程大学,测绘学院,河南,郑州,450052;72946部队,山东,淄博,255000;信息工程大学,测绘学院,河南,郑州,450052 |
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| 基金项目: | 国家自然科学基金资助项目,国家863计划资助项目 |
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| 摘 要: | 从平差基准角度,在法方程层面对最小二乘平差模型做了统一,证明重心基准空间是自由法矩阵空间的正交补空间,并进一步对平差基准问题做了几何解析。通过水准网实例,验证法方程层面平差计算及基准转换的可行性。
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| 关 键 词: | 法方程 平差基准 基准转换 向量空间 |
Analysis of adjustment datum on normal equation |
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| WANG Peng,L Zhi-ping,CHEN Zheng-sheng.Analysis of adjustment datum on normal equation[J].Engineering of Surveying and Mapping,2010,19(3):7-9,13. |
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| Authors: | WANG Peng L Zhi-ping CHEN Zheng-sheng |
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| Institution: | WANG Peng,L(U) Zhi-ping,CHEN Zheng-sheng |
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| Abstract: | This paper concludes least squares adjustment models on normal equation level.The adjustment datum is analyzed in algebra.The centrobaric datum space is the orthogonal complement of the rank-defect normal matrix space.Through a leveling network test,the accessibility of adjustment and datum transformation based on normal equation level is validated. |
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| Keywords: | normal equation adjustment datum datum transformation vector space |
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