High-dimensional data are often most plausibly generated from distributions with complex structure and leptokurtosis in some or all components. Covariance and precision matrices provide a useful summary of such structure, yet the performance of popular matrix estimators typically hinges upon a sub-Gaussianity assumption. This paper presents robust matrix estimators whose performance is guaranteed for a much richer class of distributions. The proposed estimators, under a bounded fourth moment assumption, achieve the same minimax convergence rates as do existing methods under a sub-Gaussianity assumption. Consistency of the proposed estimators is also established under the weak assumption of bounded 2+ϵ moments for ϵ∈(0,2) . The associated co...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
We consider the statistical inference for high-dimensional precision matrices. Specifically, we prop...
This is an expository paper that reviews recent developments on optimal estimation of structured hig...
The dependency structure of multivariate data can be analyzed using the covariance matrix ∑. In many...
We study the accuracy of estimating the covariance and the precision matrix of a D-variate sub-Gauss...
Precision matrix is of significant importance in a wide range of applications in multivariate analys...
Covariance matrix plays a central role in multivariate statistical analysis. Significant advances ha...
The estimation of inverse covariance matrix (also known as precision matrix) is an important proble...
Estimation of inverse covariance matrices, known as precision matrices, is important in various area...
Last decade witnesses significant methodological and theoretical advances in estimating large precis...
In this paper, we estimate the high dimensional precision matrix under the weak sparsity condition w...
The thesis concerns estimating large correlation and covariance matrices and their inverses. Two new...
Under the Gaussian assumption, the relationship between conditional independence and sparsity allows...
This paper provides some extended results on estimating parameter matrix of some regression models w...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
We consider the statistical inference for high-dimensional precision matrices. Specifically, we prop...
This is an expository paper that reviews recent developments on optimal estimation of structured hig...
The dependency structure of multivariate data can be analyzed using the covariance matrix ∑. In many...
We study the accuracy of estimating the covariance and the precision matrix of a D-variate sub-Gauss...
Precision matrix is of significant importance in a wide range of applications in multivariate analys...
Covariance matrix plays a central role in multivariate statistical analysis. Significant advances ha...
The estimation of inverse covariance matrix (also known as precision matrix) is an important proble...
Estimation of inverse covariance matrices, known as precision matrices, is important in various area...
Last decade witnesses significant methodological and theoretical advances in estimating large precis...
In this paper, we estimate the high dimensional precision matrix under the weak sparsity condition w...
The thesis concerns estimating large correlation and covariance matrices and their inverses. Two new...
Under the Gaussian assumption, the relationship between conditional independence and sparsity allows...
This paper provides some extended results on estimating parameter matrix of some regression models w...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
We consider the statistical inference for high-dimensional precision matrices. Specifically, we prop...