We consider the problem of jointly modeling multiple covariance matrices by partial common principal component analysis (PCPCA), which assumes a proportion of eigenvectors to be shared across covariance matrices and the rest to be individual-specific. This paper proposes consistent estimators of the shared eigenvectors in the PCPCA as the number of matrices or the number of samples to estimate each matrix goes to infinity. We prove such asymptotic results without making any assumptions on the ranks of eigenvalues that are associated with the shared eigenvectors. When the number of samples goes to infinity, our results do not require the data to be Gaussian distributed. Furthermore, this paper introduces a sequential testing procedure to ide...
The so-called Common Principal Components (CPC) Model, in which the covariance matrices Σi of m popu...
In this paper, we consider point estimation in a multi-sample principal components setup, in a situa...
The main objective of this thesis is to develop procedures for making inferences about the eigenvalu...
The focus of this thesis is the common principal component (CPC) model, the generalization of princi...
Finding the common principal component (CPC) for ultra-high dimensional data is a multivariate techn...
Principal component analysis is an important pattern recognition and dimensionality reduction tool i...
This paper investigates a general family of covariance models with repeated eigenvalues extending pr...
Horn’s parallel analysis is a widely used method for assessing the number of principal components an...
Horn’s parallel analysis is a widely used method for assessing the number of principal components an...
We introduce a class of M×MM×M sample covariance matrices Q which subsumes and generalizes seve...
AbstractThis paper considers principal component analysis (PCA) in familial models, where the number...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
We present a novel technique for sparse principal component analysis. This method, named Eigenvector...
This thesis consists of four papers, all exploring some aspect of common principal component analysi...
An approximate test, based on sample eigenprojections, is obtained for testing the hypothesis that t...
The so-called Common Principal Components (CPC) Model, in which the covariance matrices Σi of m popu...
In this paper, we consider point estimation in a multi-sample principal components setup, in a situa...
The main objective of this thesis is to develop procedures for making inferences about the eigenvalu...
The focus of this thesis is the common principal component (CPC) model, the generalization of princi...
Finding the common principal component (CPC) for ultra-high dimensional data is a multivariate techn...
Principal component analysis is an important pattern recognition and dimensionality reduction tool i...
This paper investigates a general family of covariance models with repeated eigenvalues extending pr...
Horn’s parallel analysis is a widely used method for assessing the number of principal components an...
Horn’s parallel analysis is a widely used method for assessing the number of principal components an...
We introduce a class of M×MM×M sample covariance matrices Q which subsumes and generalizes seve...
AbstractThis paper considers principal component analysis (PCA) in familial models, where the number...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
We present a novel technique for sparse principal component analysis. This method, named Eigenvector...
This thesis consists of four papers, all exploring some aspect of common principal component analysi...
An approximate test, based on sample eigenprojections, is obtained for testing the hypothesis that t...
The so-called Common Principal Components (CPC) Model, in which the covariance matrices Σi of m popu...
In this paper, we consider point estimation in a multi-sample principal components setup, in a situa...
The main objective of this thesis is to develop procedures for making inferences about the eigenvalu...