徐天河, 杨元喜. 均方误差意义下正则化解优于最小二乘解的条件[J]. 武汉大学学报 ( 信息科学版), 2004, 29(3): 223-226.
引用本文: 徐天河, 杨元喜. 均方误差意义下正则化解优于最小二乘解的条件[J]. 武汉大学学报 ( 信息科学版), 2004, 29(3): 223-226.
XU Tianhe, YANG Yuanxi. Condition of Regularization Solution Superior to LS Solution Based on MSE Principle[J]. Geomatics and Information Science of Wuhan University, 2004, 29(3): 223-226.
Citation: XU Tianhe, YANG Yuanxi. Condition of Regularization Solution Superior to LS Solution Based on MSE Principle[J]. Geomatics and Information Science of Wuhan University, 2004, 29(3): 223-226.

均方误差意义下正则化解优于最小二乘解的条件

Condition of Regularization Solution Superior to LS Solution Based on MSE Principle

  • 摘要: 利用矩阵理论导出了均方误差意义下正则化解优于最小二乘解的条件,构造了相应的检验统计量,推导出的条件式及其相应的假设检验适合于各种正则化矩阵类型的Tikhonov正则化方法。

     

    Abstract: The condition of regularization solution superior to LS solution is deduced on the basis of the MSE principle.A statistic for testing this condition is constructed.If the null hypothesis is accepted with a significance level, it indicates that regularization solution is superior to LS solution, which also verifies that the determined regularization matrix and regularization factor are reasonable.On the contrary, if the null hypothesis is rejected, it means that the regularization method is unreasonably used.Since the regularization matrix and regularization factor is variant and can be changed,we can modify their values until the null hypothesis is accepted.The condition and its statistic given in this paper are fit for all kinds of Tikhonov regularization methods.

     

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