We derive the limiting form of the eigenvalue spectrum for sample covariance matrices produced from non-isotropic data. For the analysis of standard PCA we study the case where the data has increased variance along a small number of symmetry-breaking directions. The spectrum depends on the strength of the symmetry-breaking signals and on a parameter α which is the ratio of sample size to data dimension. Results are derived in the limit of large data dimension while keeping α fixed. As α increases there are transitions in which delta functions emerge from the upper end of the bulk spectrum, corresponding to the symmetry-breaking directions in the data, and we calculate the bias in the corresponding eigenvalues. For kernel PCA the covariance ...
The aim of this paper is to establish several deep theoretical properties of principal component ana...
We consider large complex random sample covariance matrices obtained from ``spiked populations'', th...
In this work we study the extreme eigenvalues and eigenvectors of sample correlation matrices arisin...
When the data are high dimensional, widely used multivariate statistical methods such as principal c...
AbstractIn High Dimension, Low Sample Size (HDLSS) data situations, where the dimension d is much la...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
The Principal Component Analysis (PCA) is a famous technique from multivariate statistics. It is fre...
<p>(A) Eigenvalue distribution of an example population covariance matrix () computed from the van ...
This paper considers the problem of detecting a few signals in high-dimensional complex-valued Gauss...
In High Dimension, Low Sample Size (HDLSS) data situations, where the dimension d is much larger tha...
In this paper, we propose a new methodology to deal with PCA in high-dimension, low-sample-size (HDL...
International audienceRenormalization group techniques are widely used in modern physics to describe...
Abstract: We consider a multivariate Gaussian observation model where the covariance matrix is diago...
We prove a central limit theorem for the difference of linear eigenvalue statistics of a sample cova...
A positive definite symmetric variance covariance matrix with non-zero diagonal entries- plays an im...
The aim of this paper is to establish several deep theoretical properties of principal component ana...
We consider large complex random sample covariance matrices obtained from ``spiked populations'', th...
In this work we study the extreme eigenvalues and eigenvectors of sample correlation matrices arisin...
When the data are high dimensional, widely used multivariate statistical methods such as principal c...
AbstractIn High Dimension, Low Sample Size (HDLSS) data situations, where the dimension d is much la...
We introduce a class of M ×M sample covariance matrices Q which subsumes and generalizes several pre...
The Principal Component Analysis (PCA) is a famous technique from multivariate statistics. It is fre...
<p>(A) Eigenvalue distribution of an example population covariance matrix () computed from the van ...
This paper considers the problem of detecting a few signals in high-dimensional complex-valued Gauss...
In High Dimension, Low Sample Size (HDLSS) data situations, where the dimension d is much larger tha...
In this paper, we propose a new methodology to deal with PCA in high-dimension, low-sample-size (HDL...
International audienceRenormalization group techniques are widely used in modern physics to describe...
Abstract: We consider a multivariate Gaussian observation model where the covariance matrix is diago...
We prove a central limit theorem for the difference of linear eigenvalue statistics of a sample cova...
A positive definite symmetric variance covariance matrix with non-zero diagonal entries- plays an im...
The aim of this paper is to establish several deep theoretical properties of principal component ana...
We consider large complex random sample covariance matrices obtained from ``spiked populations'', th...
In this work we study the extreme eigenvalues and eigenvectors of sample correlation matrices arisin...