This paper considers estimation of sparse covariance matrices and establishes the optimal rate of convergence under a range of matrix operator norm and Bregman divergence losses. A major focus is on the derivation of a rate sharp minimax lower bound. The problem exhibits new features that are significantly different from those that occur in the conventional nonparametric function estimation problems. Standard techniques fail to yield good results, and new tools are thus needed. We first develop a lower bound technique that is particularly well suited for treating “two-directional” problems such as estimating sparse covariance matrices. The result can be viewed as a generalization of Le Cam’s method in one direction and Assouad’s Lemma in an...
In recent years, Sparse Principal Component Analysis has emerged as an extremely popular dimension r...
In this article we consider estimation of sparse covariance matrices and propose a thresholding proc...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
This paper considers estimation of sparse covariance matrices and establishes the optimal rate of co...
Covariance matrix plays a central role in multivariate statistical analysis. Significant advances ha...
International audienceAn increasing number of applications is concerned with recovering a sparse mat...
This paper aims at achieving a simultaneously sparse and low-rank estimator from the semidef-inite p...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
Precision matrix is of significant importance in a wide range of applications in multivariate analys...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
The thresholding covariance estimator has nice asymptotic properties for estimating sparse large cov...
Toeplitz covariance matrices are used in the analysis of stationary stochastic processes and a wide ...
This is an expository paper that reviews recent developments on optimal estimation of structured hig...
Abstract. High-dimensional statistical tests often ignore correlations to gain simplicity and stabil...
High-dimensional statistical tests often ignore correlations to gain simplicity and stability leadin...
In recent years, Sparse Principal Component Analysis has emerged as an extremely popular dimension r...
In this article we consider estimation of sparse covariance matrices and propose a thresholding proc...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
This paper considers estimation of sparse covariance matrices and establishes the optimal rate of co...
Covariance matrix plays a central role in multivariate statistical analysis. Significant advances ha...
International audienceAn increasing number of applications is concerned with recovering a sparse mat...
This paper aims at achieving a simultaneously sparse and low-rank estimator from the semidef-inite p...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
Precision matrix is of significant importance in a wide range of applications in multivariate analys...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
The thresholding covariance estimator has nice asymptotic properties for estimating sparse large cov...
Toeplitz covariance matrices are used in the analysis of stationary stochastic processes and a wide ...
This is an expository paper that reviews recent developments on optimal estimation of structured hig...
Abstract. High-dimensional statistical tests often ignore correlations to gain simplicity and stabil...
High-dimensional statistical tests often ignore correlations to gain simplicity and stability leadin...
In recent years, Sparse Principal Component Analysis has emerged as an extremely popular dimension r...
In this article we consider estimation of sparse covariance matrices and propose a thresholding proc...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...