Last decade witnesses significant methodological and theoretical advances in estimating large precision matrices. In particular, there are scientific applications such as longitudinal data, meteorology and spectroscopy in which the ordering of the variables can be interpreted through a bandable structure on the Cholesky factor of the precision matrix. However, the minimax theory has still been largely unknown, as opposed to the well established minimax results over the corresponding bandable covariance matrices. In this thesis, we focus on two commonly used types of parameter spaces, and develop the optimal rates of convergence under both the operator norm and the Frobenius norm. A striking phenomenon is found: two types of parameter spac...
Estimation of covariance matrices in various norms is an issue that finds applications in a wide ran...
Consider the problem of estimating the Shannon entropy of a distribution over k elements from n inde...
In this work we construct an optimal shrinkage estimator for the precision matrix in high dimensions...
Covariance matrix plays a central role in multivariate statistical analysis. Significant advances ha...
This is an expository paper that reviews recent developments on optimal estimation of structured hig...
This paper focuses on exploring the sparsity of the inverse covariance matrix $\bSigma^{-1}$, or the...
Precision matrix is of significant importance in a wide range of applications in multivariate analys...
Toeplitz covariance matrices are used in the analysis of stationary stochastic processes and a wide ...
Estimation of large covariance matrices has drawn considerable recent attention, and the theoretical...
This paper considers estimation of sparse covariance matrices and establishes the optimal rate of co...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
High-dimensional data are often most plausibly generated from distributions with complex structure a...
Covariance structure plays an important role in high-dimensional statistical inference. In a range o...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
High-dimensional statistical tests often ignore correlations to gain simplicity and stability leadin...
Estimation of covariance matrices in various norms is an issue that finds applications in a wide ran...
Consider the problem of estimating the Shannon entropy of a distribution over k elements from n inde...
In this work we construct an optimal shrinkage estimator for the precision matrix in high dimensions...
Covariance matrix plays a central role in multivariate statistical analysis. Significant advances ha...
This is an expository paper that reviews recent developments on optimal estimation of structured hig...
This paper focuses on exploring the sparsity of the inverse covariance matrix $\bSigma^{-1}$, or the...
Precision matrix is of significant importance in a wide range of applications in multivariate analys...
Toeplitz covariance matrices are used in the analysis of stationary stochastic processes and a wide ...
Estimation of large covariance matrices has drawn considerable recent attention, and the theoretical...
This paper considers estimation of sparse covariance matrices and establishes the optimal rate of co...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
High-dimensional data are often most plausibly generated from distributions with complex structure a...
Covariance structure plays an important role in high-dimensional statistical inference. In a range o...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
High-dimensional statistical tests often ignore correlations to gain simplicity and stability leadin...
Estimation of covariance matrices in various norms is an issue that finds applications in a wide ran...
Consider the problem of estimating the Shannon entropy of a distribution over k elements from n inde...
In this work we construct an optimal shrinkage estimator for the precision matrix in high dimensions...