This paper aims at achieving a simultaneously sparse and low-rank estimator from the semidef-inite population covariance matrices.We first benefit from a convex optimization which develops `1-norm penalty to encourage the sparsity and nuclear norm to favor the low-rank property. For the proposed estimator, we then prove that with large probability, the Frobenious norm of the estimation rate can be of order O (s logr)/n under a mild case, where s and r denote the num-ber of sparse entries and the rank of the population covariance respectively, n notes the sample capacity. Finally an efficient alternating direction method of multipliers with global convergence is proposed to tackle this problem, and meantime merits of the approach are also il...
Recently, major attention has been given to penalized log-likelihood estimators for sparse precision...
We offer a method to estimate a covariance matrix in the special case that both the covariance matri...
Abstract—This paper presents a new method for estimating high dimensional covariance matrices. Our m...
The present thesis concerns large covariance matrix estimation via composite minimization under the ...
The present paper concerns large covariance matrix estimation via composite minimization under the ...
This paper considers estimation of sparse covariance matrices and establishes the optimal rate of co...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
Parameter expanded and standard expectation maximisation algorithms are described for reduced rank ...
We introduce a new sparse estimator of the covariance matrix for high-dimensional models in which th...
Abstract We consider the maximum likelihood estimation of sparse inverse covariance matrices. We de...
The thresholding covariance estimator has nice asymptotic properties for estimating sparse large cov...
The thresholding covariance estimator has nice asymptotic properties for estimating sparse large cov...
The use of sparsity has emerged in the last fifteen years as an important tool for solving many prob...
In this work, we generalize the recent sparse iterative covariance-based estimator (SPICE) by extend...
© 2017 Dimitris Bertsimas, Martin S. Copenhaver, and Rahul Mazumder. Factor Analysis (FA) is a techn...
Recently, major attention has been given to penalized log-likelihood estimators for sparse precision...
We offer a method to estimate a covariance matrix in the special case that both the covariance matri...
Abstract—This paper presents a new method for estimating high dimensional covariance matrices. Our m...
The present thesis concerns large covariance matrix estimation via composite minimization under the ...
The present paper concerns large covariance matrix estimation via composite minimization under the ...
This paper considers estimation of sparse covariance matrices and establishes the optimal rate of co...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
Parameter expanded and standard expectation maximisation algorithms are described for reduced rank ...
We introduce a new sparse estimator of the covariance matrix for high-dimensional models in which th...
Abstract We consider the maximum likelihood estimation of sparse inverse covariance matrices. We de...
The thresholding covariance estimator has nice asymptotic properties for estimating sparse large cov...
The thresholding covariance estimator has nice asymptotic properties for estimating sparse large cov...
The use of sparsity has emerged in the last fifteen years as an important tool for solving many prob...
In this work, we generalize the recent sparse iterative covariance-based estimator (SPICE) by extend...
© 2017 Dimitris Bertsimas, Martin S. Copenhaver, and Rahul Mazumder. Factor Analysis (FA) is a techn...
Recently, major attention has been given to penalized log-likelihood estimators for sparse precision...
We offer a method to estimate a covariance matrix in the special case that both the covariance matri...
Abstract—This paper presents a new method for estimating high dimensional covariance matrices. Our m...