AbstractLet the kp-variate random vector X be partitioned into k subvectors Xi of dimension p each, and let the covariance matrix Ψ of X be partitioned analogously into submatrices Ψij. The common principal component (CPC) model for dependent random vectors assumes the existence of an orthogonal p by p matrix β such that βtΨijβ is diagonal for all (i, j). After a formal definition of the model, normal theory maximum likelihood estimators are obtained. The asymptotic theory for the estimated orthogonal matrix is derived by a new technique of choosing proper subsets of functionally independent parameters
In this article models based on pq-dimensional normally distributed ran-dom vectors x are studied wi...
Principal components analysis relates to the eigenvalue distribution of Wishart matrices. Given few ...
Nonlinear principal components are defined for normal random vectors. Their properties are investiga...
Let the kp-variate random vector X be partitioned into k subvectors Xi of dimension p each, and let ...
AbstractLet the kp-variate random vector X be partitioned into k subvectors Xi of dimension p each, ...
The focus of this thesis is the common principal component (CPC) model, the generalization of princi...
The so-called Common Principal Components (CPC) Model, in which the covariance matrices Σi of m popu...
The common principal components (CPC) and the proportional principal components (PPC) models are two...
In this article we consider a pq-dimensional random vector x distributed normally with mean vector θ...
International audienceA novel approximate representation of non-Gaussian random vectors is introduce...
AbstractThe principal components of a vector of random variables are related to the common factors o...
AbstractConsider the multivariate linear model for the random matrixYn×p∼MN(XB,V⊗Σ), whereBis the pa...
Nonlinear principal components for an absolutely continuous random vector X with positive bounded de...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
AbstractBased on the concept of complexity or minimum description length developed by Kolmogorov, Ri...
In this article models based on pq-dimensional normally distributed ran-dom vectors x are studied wi...
Principal components analysis relates to the eigenvalue distribution of Wishart matrices. Given few ...
Nonlinear principal components are defined for normal random vectors. Their properties are investiga...
Let the kp-variate random vector X be partitioned into k subvectors Xi of dimension p each, and let ...
AbstractLet the kp-variate random vector X be partitioned into k subvectors Xi of dimension p each, ...
The focus of this thesis is the common principal component (CPC) model, the generalization of princi...
The so-called Common Principal Components (CPC) Model, in which the covariance matrices Σi of m popu...
The common principal components (CPC) and the proportional principal components (PPC) models are two...
In this article we consider a pq-dimensional random vector x distributed normally with mean vector θ...
International audienceA novel approximate representation of non-Gaussian random vectors is introduce...
AbstractThe principal components of a vector of random variables are related to the common factors o...
AbstractConsider the multivariate linear model for the random matrixYn×p∼MN(XB,V⊗Σ), whereBis the pa...
Nonlinear principal components for an absolutely continuous random vector X with positive bounded de...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
AbstractBased on the concept of complexity or minimum description length developed by Kolmogorov, Ri...
In this article models based on pq-dimensional normally distributed ran-dom vectors x are studied wi...
Principal components analysis relates to the eigenvalue distribution of Wishart matrices. Given few ...
Nonlinear principal components are defined for normal random vectors. Their properties are investiga...