The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In particular, it is shown that the rank of the asymptotic covariance matrix depends on distributional parameters in a somewhat complicated manner. The results obtained in this paper can be used to determine this rank. Some applications of the asymptotic distribution of these eigenprojections to inferential problems involving principal components subspaces are given
AbstractThe asymptotic distribution of the eigenvalues and eigenvectors of the robust scatter matrix...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
Algebraically, principal components can be defined as the eigenvalues and eigenvectors of a covarian...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
The asymptotic distribution of the eigenvectors and eigenvalues in correspondence analysis is derive...
In this paper, the authors obtained asymptotic expressions for the joint distributions of certain fu...
AbstractMultivariate asymptotic (normal) distributions for eigenvalues and unit-length eigenvectors ...
AbstractThe authors investigated the asymptotic joint distributions of certain functions of the eige...
AbstractThe asymptotic covariance matrix of the sample correlation matrix is derived in matrix form ...
We consider linear spectral statistics built from the block-normalized correlation matrix of a set o...
AbstractA general matrix expression for the asymptotic covariance matrix of correlation coefficients...
Proceedings - IEEE International Symposium on Circuits and Systems21251-1254PICS
The Principal Component Analysis (PCA) is a famous technique from multivariate statistics. It is fre...
This paper deals with the distribution of the LR statistic for testing the hypothesis that the small...
AbstractThe asymptotic distribution of the eigenvalues and eigenvectors of the robust scatter matrix...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
Algebraically, principal components can be defined as the eigenvalues and eigenvectors of a covarian...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
The asymptotic distribution of the eigenvectors and eigenvalues in correspondence analysis is derive...
In this paper, the authors obtained asymptotic expressions for the joint distributions of certain fu...
AbstractMultivariate asymptotic (normal) distributions for eigenvalues and unit-length eigenvectors ...
AbstractThe authors investigated the asymptotic joint distributions of certain functions of the eige...
AbstractThe asymptotic covariance matrix of the sample correlation matrix is derived in matrix form ...
We consider linear spectral statistics built from the block-normalized correlation matrix of a set o...
AbstractA general matrix expression for the asymptotic covariance matrix of correlation coefficients...
Proceedings - IEEE International Symposium on Circuits and Systems21251-1254PICS
The Principal Component Analysis (PCA) is a famous technique from multivariate statistics. It is fre...
This paper deals with the distribution of the LR statistic for testing the hypothesis that the small...
AbstractThe asymptotic distribution of the eigenvalues and eigenvectors of the robust scatter matrix...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
Algebraically, principal components can be defined as the eigenvalues and eigenvectors of a covarian...