We study sparse principal component analysis for high dimensional vector autoregressive time series under a doubly asymptotic framework, which allows the dimension d to scale with the series length T. We treat the transition matrix of time series as a nuisance parameter and directly apply sparse principal component analysis on multivariate time series as if the data are independent. We provide explicit non-asymptotic rates of convergence for leading eigenvector estimation and extend this result to principal subspace estimation. Our analysis illustrates that the spectral norm of the transition matrix plays an essential role in determining the final rates. We also characterize sufficient conditions under which sparse principal component analy...
We study the problem of estimating the leading eigenvectors of a high-dimensional population covaria...
We study the performance of principal component analysis (PCA). In particular, we consider the probl...
The effect of nonstationarity in time series columns of input data in principal components analysis ...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
Sparse Principal Component Analysis (PCA) methods are efficient tools to reduce the dimension (or nu...
We introduce a new method for sparse principal component analysis, based on the aggregation of eigen...
In recent years, Sparse Principal Component Analysis has emerged as an extremely popular dimension r...
We study sparse principal components analysis in high dimensions, where p (the number of variables) ...
In recent years, Sparse Principal Component Analysis has emerged as an extremely popular dimension r...
Principal component analysis (PCA) is a most frequently used statistical tool in almost all branches...
In sparse principal component analysis we are given noisy observations of a low-rank matrix of di-me...
We perform a finite sample analysis of the detection levels for sparse principal components of a hig...
Advances in data acquisition and emergence of new sources of data, in recent years, have led to gene...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
We propose a semiparametric sparse principal component analysis method named el-liptical component a...
We study the problem of estimating the leading eigenvectors of a high-dimensional population covaria...
We study the performance of principal component analysis (PCA). In particular, we consider the probl...
The effect of nonstationarity in time series columns of input data in principal components analysis ...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
Sparse Principal Component Analysis (PCA) methods are efficient tools to reduce the dimension (or nu...
We introduce a new method for sparse principal component analysis, based on the aggregation of eigen...
In recent years, Sparse Principal Component Analysis has emerged as an extremely popular dimension r...
We study sparse principal components analysis in high dimensions, where p (the number of variables) ...
In recent years, Sparse Principal Component Analysis has emerged as an extremely popular dimension r...
Principal component analysis (PCA) is a most frequently used statistical tool in almost all branches...
In sparse principal component analysis we are given noisy observations of a low-rank matrix of di-me...
We perform a finite sample analysis of the detection levels for sparse principal components of a hig...
Advances in data acquisition and emergence of new sources of data, in recent years, have led to gene...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
We propose a semiparametric sparse principal component analysis method named el-liptical component a...
We study the problem of estimating the leading eigenvectors of a high-dimensional population covaria...
We study the performance of principal component analysis (PCA). In particular, we consider the probl...
The effect of nonstationarity in time series columns of input data in principal components analysis ...