去相关
可列斯基分解
主成分分析
协方差矩阵
数学
正交性
独立成分分析
预处理器
航程(航空)
基质(化学分析)
计算机科学
算法
统计
人工智能
特征向量
材料科学
几何学
复合材料
物理
量子力学
作者
Agnan Kessy,Alex Lewin,Korbinian Strimmer
标识
DOI:10.1080/00031305.2016.1277159
摘要
Whitening, or sphering, is a common preprocessing step in statistical analysis to transform random variables to orthogonality. However, due to rotational freedom there are infinitely many possible whitening procedures. Consequently, there is a diverse range of sphering methods in use, for example, based on principal component analysis (PCA), Cholesky matrix decomposition, and zero-phase component analysis (ZCA), among others. Here, we provide an overview of the underlying theory and discuss five natural whitening procedures. Subsequently, we demonstrate that investigating the cross-covariance and the cross-correlation matrix between sphered and original variables allows to break the rotational invariance and to identify optimal whitening transformations. As a result we recommend two particular approaches: ZCA-cor whitening to produce sphered variables that are maximally similar to the original variables, and PCA-cor whitening to obtain sphered variables that maximally compress the original variables.
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