While principal component analysis is a widely used technique in applied multivariate analysis, little attention is normally given to the comparison of covariance matrices. Based on Roy's largest and smallest roots' criterion, we expose some known properties of the eigenvectors of the matrix Sigma1-1Sigma2. The linear combinations defined by these eigenvectors are discussed as a generalisation of principal component analysis of two groups, which can be useful in the case Sigma1 not equal to Sigma2. The technique is illustrated by an example. A similar approach to the comparison of covariance matrices, based on the notion of Mahalanobis distance, is sketched. Finally, three equivalent conditions are given for the condition that two covariance matrices have identical principal axes. This leads to the definition of four degrees of similarity of two covariance matrices.
Описание
ScienceDirect - Computational Statistics & Data Analysis : Some relations between the comparison of covariance matrices and principal component analysis
%0 Journal Article
%1 Flury198397
%A Flury, Bernhard
%D 1983
%J Computational Statistics & Data Analysis
%K covariance multivariate pca statistics
%P 97 - 109
%R 10.1016/0167-9473(83)90077-4
%T Some relations between the comparison of covariance matrices and principal component analysis
%U http://www.sciencedirect.com/science/article/B6V8V-482YJ89-R/2/4cb2977bfc4e729e66443abbe9a14bd2
%V 1
%X While principal component analysis is a widely used technique in applied multivariate analysis, little attention is normally given to the comparison of covariance matrices. Based on Roy's largest and smallest roots' criterion, we expose some known properties of the eigenvectors of the matrix Sigma1-1Sigma2. The linear combinations defined by these eigenvectors are discussed as a generalisation of principal component analysis of two groups, which can be useful in the case Sigma1 not equal to Sigma2. The technique is illustrated by an example. A similar approach to the comparison of covariance matrices, based on the notion of Mahalanobis distance, is sketched. Finally, three equivalent conditions are given for the condition that two covariance matrices have identical principal axes. This leads to the definition of four degrees of similarity of two covariance matrices.
@article{Flury198397,
abstract = {While principal component analysis is a widely used technique in applied multivariate analysis, little attention is normally given to the comparison of covariance matrices. Based on Roy's largest and smallest roots' criterion, we expose some known properties of the eigenvectors of the matrix [Sigma]1-1[Sigma]2. The linear combinations defined by these eigenvectors are discussed as a generalisation of principal component analysis of two groups, which can be useful in the case [Sigma]1 [not equal to] [Sigma]2. The technique is illustrated by an example. A similar approach to the comparison of covariance matrices, based on the notion of Mahalanobis distance, is sketched. Finally, three equivalent conditions are given for the condition that two covariance matrices have identical principal axes. This leads to the definition of four degrees of similarity of two covariance matrices.},
added-at = {2010-10-04T18:18:44.000+0200},
author = {Flury, Bernhard},
biburl = {https://www.bibsonomy.org/bibtex/2897295cb7f01245c708290589bb5a98c/vivion},
description = {ScienceDirect - Computational Statistics & Data Analysis : Some relations between the comparison of covariance matrices and principal component analysis},
doi = {10.1016/0167-9473(83)90077-4},
interhash = {acfe061bf06d59082039a97e7baf957a},
intrahash = {897295cb7f01245c708290589bb5a98c},
issn = {0167-9473},
journal = {Computational Statistics & Data Analysis},
keywords = {covariance multivariate pca statistics},
pages = {97 - 109},
timestamp = {2010-10-04T18:18:44.000+0200},
title = {Some relations between the comparison of covariance matrices and principal component analysis},
url = {http://www.sciencedirect.com/science/article/B6V8V-482YJ89-R/2/4cb2977bfc4e729e66443abbe9a14bd2},
volume = 1,
year = 1983
}