Separation theorems for singular values of a matrix, similar to the Poincarè separation theorem for the eigenvalues of a Hermitian matrix, are proved. The results are applied to problems in approximating a given r.v. by an r.v. in a specified class. In particular, problems of canonical correlations, reduced rank regression, fitting an orthogonal random variable (r.v.) to a given r.v., and estimation of residuals in the Gauss-Markoff model are discussed. In each case, a solution is obtained by minimizing a suitable norm. In some cases a common solution is shown to minimize a wide class of norms known as unitarily invariant norms introduced by von Neumann
Gaussian graphical models are semi-algebraic subsets of the cone of positive definite covariance mat...
AbstractThis paper considers the eigenvalues and singular values of certain matrix-valued random var...
Kieburg M, Kösters H. Exact relation between singular value and eigenvalue statistics. RANDOM MATRIC...
AbstractSeparation theorems for singular values of a matrix, similar to the Poincaré separation theo...
AbstractWe obtain usable bounds for the asymptotic percentage points of chi-squared tests of fit for...
AbstractSome simple estimation theorems for singular values of a rectangular matrix A are given. The...
Many multivariate techniques in statistics are described in terms of an appropriate sums of squares ...
This article describes a local parameterization of orthogonal and semi-orthogonal matrices. The para...
Abstract—In many practical situations we would like to es-timate the covariance matrix of a set of v...
The need for calculating and characterizing singular normal distributions arises in a natural way wh...
The Davis–Kahan theorem is used in the analysis of many statistical procedures to bound the distance...
summary:The aim of this paper is to characterize the Multivariate Gauss-Markoff model $(MGM)$ as in ...
We give some lower bounds on the separations sep(1)(A, B), sep(infinity)(A, B), and sep(F)(A, B). Th...
In problems where a distribution is concentrated in a lower-dimensional subspace, the covariance mat...
This thesis considers the problem of estimating parameter matrices and their eigenvalues in various ...
Gaussian graphical models are semi-algebraic subsets of the cone of positive definite covariance mat...
AbstractThis paper considers the eigenvalues and singular values of certain matrix-valued random var...
Kieburg M, Kösters H. Exact relation between singular value and eigenvalue statistics. RANDOM MATRIC...
AbstractSeparation theorems for singular values of a matrix, similar to the Poincaré separation theo...
AbstractWe obtain usable bounds for the asymptotic percentage points of chi-squared tests of fit for...
AbstractSome simple estimation theorems for singular values of a rectangular matrix A are given. The...
Many multivariate techniques in statistics are described in terms of an appropriate sums of squares ...
This article describes a local parameterization of orthogonal and semi-orthogonal matrices. The para...
Abstract—In many practical situations we would like to es-timate the covariance matrix of a set of v...
The need for calculating and characterizing singular normal distributions arises in a natural way wh...
The Davis–Kahan theorem is used in the analysis of many statistical procedures to bound the distance...
summary:The aim of this paper is to characterize the Multivariate Gauss-Markoff model $(MGM)$ as in ...
We give some lower bounds on the separations sep(1)(A, B), sep(infinity)(A, B), and sep(F)(A, B). Th...
In problems where a distribution is concentrated in a lower-dimensional subspace, the covariance mat...
This thesis considers the problem of estimating parameter matrices and their eigenvalues in various ...
Gaussian graphical models are semi-algebraic subsets of the cone of positive definite covariance mat...
AbstractThis paper considers the eigenvalues and singular values of certain matrix-valued random var...
Kieburg M, Kösters H. Exact relation between singular value and eigenvalue statistics. RANDOM MATRIC...