AbstractThis article describes a local parameterization of orthogonal and semi-orthogonal matrices. The parameterization leads to a unified approach for obtaining the asymptotic joint distributions of estimators of singular-values and -vectors, and of eigen-values and -vectors. The singular- or eigen-values can have arbitrary multiplicities. The approach is illustrated on principal components analyzes, canonical correlation analysis, inter-battery factory analysis, and reduced-rank regression
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
In this paper, the authors obtained asymptotic expressions for the joint distributions of certain fu...
Restricted Access.Exact eigenvalue correlation functions are computed for large N hermitian one-matr...
This article describes a local parameterization of orthogonal and semi-orthogonal matrices. The para...
AbstractThis article describes a local parameterization of orthogonal and semi-orthogonal matrices. ...
This thesis considers the problem of estimating parameter matrices and their eigenvalues in various ...
Two transformations are proposed that give orthogonal components with a one-to-one correspondence be...
Orthogonal and partly orthogonal reparametrisations are provided for certain wide and important fami...
AbstractMany multivariate statistical procedures, such as principal component, canonical correlation...
It is shown that for many parametric families the condition for a parameter to be orthogonal to the ...
The analysis of variance plays a fundamental role in statistical theory and practice, the standard E...
Separation theorems for singular values of a matrix, similar to the Poincarè separation theorem for ...
A new methodology to aid interpretation of a principal compo-nent analysis is presented. While prese...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
International audienceThe singular value decomposition C = U*Lambda*transpose(V) is among the most u...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
In this paper, the authors obtained asymptotic expressions for the joint distributions of certain fu...
Restricted Access.Exact eigenvalue correlation functions are computed for large N hermitian one-matr...
This article describes a local parameterization of orthogonal and semi-orthogonal matrices. The para...
AbstractThis article describes a local parameterization of orthogonal and semi-orthogonal matrices. ...
This thesis considers the problem of estimating parameter matrices and their eigenvalues in various ...
Two transformations are proposed that give orthogonal components with a one-to-one correspondence be...
Orthogonal and partly orthogonal reparametrisations are provided for certain wide and important fami...
AbstractMany multivariate statistical procedures, such as principal component, canonical correlation...
It is shown that for many parametric families the condition for a parameter to be orthogonal to the ...
The analysis of variance plays a fundamental role in statistical theory and practice, the standard E...
Separation theorems for singular values of a matrix, similar to the Poincarè separation theorem for ...
A new methodology to aid interpretation of a principal compo-nent analysis is presented. While prese...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
International audienceThe singular value decomposition C = U*Lambda*transpose(V) is among the most u...
The asymptotic distribution of an eigenprojection for a sample correlation matrix is obtained. In pa...
In this paper, the authors obtained asymptotic expressions for the joint distributions of certain fu...
Restricted Access.Exact eigenvalue correlation functions are computed for large N hermitian one-matr...