We consider inference on the eigenvalues of the covariance matrix of a multivariate normal distribution. The family of multivariate normal distributions with a fixed mean is seen as a Riemannian manifold with Fisher information metric. Two submanifolds naturally arises: one is the submanifold given by the fixed eigenvectors of the covariance matrix; the other is the one given by the fixed eigenvalues. We analyze the geometrical structures of these manifolds such as metric, embedding curvature under e-connection or m-connection. Based on these results, we study (1) the bias of the sample eigenvalues, (2) the asymptotic variance of estimators, (3) the asymptotic information loss caused by neglecting the sample eigenvectors, (4) the derivation...
International audienceThe study of P(m), the manifold of m x m symmetric positive definite matrices,...
AbstractWe consider a multivariate normal distribution with a covariance structure. A set of observa...
This article presents maximum likelihood estimators (MLEs) and log-likelihood ratio (LLR) tests for ...
We consider inference on the eigenvalues of the covariance matrix of a multivariate normal distribut...
Three methods for estimating the eigenvalues of the parameter covariance matrix in a Wishart distrib...
An admissible estimator of the eigenvalues of the variance-covariance matrix is given for multivaria...
AbstractSuppose a random vector X has a multinormal distribution with covariance matrix Σ of the for...
AbstractIn the normal two-sample problem, an invariant test for the hypothesis of the equality of th...
We consider settings where the observations are drawn from a zero-mean multivariate (real or complex...
Under rotation-equivariant decision theory, sample covariance matrix eigenvalues can be optimally sh...
AbstractFor n > 1 let X = (X1,…,Xn)′ have a mean vector θ1 and covariance matrix σ2Σ, where 1 = (1,…...
AbstractLet X1, …, Xn (n > p > 2) be independently and identically distributed p-dimensional normal ...
Improved estimation of eigen vector of covariance matrix is considered under uncertain prior inform...
We consider the affine equivariant sign covariance matrix (SCM) introduced by Visuri et al. (J. Stat...
The problem of estimating large covariance matrices of multivariate real normal and complex normal d...
International audienceThe study of P(m), the manifold of m x m symmetric positive definite matrices,...
AbstractWe consider a multivariate normal distribution with a covariance structure. A set of observa...
This article presents maximum likelihood estimators (MLEs) and log-likelihood ratio (LLR) tests for ...
We consider inference on the eigenvalues of the covariance matrix of a multivariate normal distribut...
Three methods for estimating the eigenvalues of the parameter covariance matrix in a Wishart distrib...
An admissible estimator of the eigenvalues of the variance-covariance matrix is given for multivaria...
AbstractSuppose a random vector X has a multinormal distribution with covariance matrix Σ of the for...
AbstractIn the normal two-sample problem, an invariant test for the hypothesis of the equality of th...
We consider settings where the observations are drawn from a zero-mean multivariate (real or complex...
Under rotation-equivariant decision theory, sample covariance matrix eigenvalues can be optimally sh...
AbstractFor n > 1 let X = (X1,…,Xn)′ have a mean vector θ1 and covariance matrix σ2Σ, where 1 = (1,…...
AbstractLet X1, …, Xn (n > p > 2) be independently and identically distributed p-dimensional normal ...
Improved estimation of eigen vector of covariance matrix is considered under uncertain prior inform...
We consider the affine equivariant sign covariance matrix (SCM) introduced by Visuri et al. (J. Stat...
The problem of estimating large covariance matrices of multivariate real normal and complex normal d...
International audienceThe study of P(m), the manifold of m x m symmetric positive definite matrices,...
AbstractWe consider a multivariate normal distribution with a covariance structure. A set of observa...
This article presents maximum likelihood estimators (MLEs) and log-likelihood ratio (LLR) tests for ...