The ℓ1-regularized Gaussian maximum likelihood method is a common approach for sparse precision matrix estimation, but one that poses a computational challenge for high-dimensional datasets. We present a novel ℓ1- regularized maximum likelihood method for performant large-scale sparse precision matrix estimation utilizing the block structures in the underlying computations. We identify the computational bottlenecks and contribute a block coordinate descent update as well as a block approximate matrix inversion routine, which is then parallelized using a shared-memory scheme. We demonstrate the effectiveness, accuracy, and performance of these algorithms. Our numerical examples and comparative results with various modern open-source pa...
Given n samples X1, X2,..., Xn from N(0,Σ), we are interested in estimating the p × p precision matr...
We consider the statistical inference for high-dimensional precision matrices. Specifically, we prop...
We propose a semiparametric procedure for estimating high dimensional sparse inverse covariance matr...
A method that estimates the precision matrix of multiple variables in the extreme scope of “ultrahig...
The `1-regularized Gaussian maximum likelihood estimator (MLE) has been shown to have strong statist...
<p>The use of sparse precision (inverse covariance) matrices has become popular because they allow f...
Thesis: S.M., Massachusetts Institute of Technology, Sloan School of Management, Operations Research...
We apply a method recently introduced to the statistical literature to directly estimate the precisi...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
We consider the problem of sparse precision matrix estimation in high dimensions using the CLIME est...
Abstract—Estimating large sparse precision matrices is an in-teresting and challenging problem in ma...
Estimating large sparse inverse covariance matrices (precision matrices) is an interesting and chall...
This paper focuses on exploring the sparsity of the inverse covariance matrix $\bSigma^{-1}$, or the...
We consider the problem of sparse precision matrix estimation in high dimensions using the CLIME est...
The estimation of inverse covariance matrix (also known as precision matrix) is an important proble...
Given n samples X1, X2,..., Xn from N(0,Σ), we are interested in estimating the p × p precision matr...
We consider the statistical inference for high-dimensional precision matrices. Specifically, we prop...
We propose a semiparametric procedure for estimating high dimensional sparse inverse covariance matr...
A method that estimates the precision matrix of multiple variables in the extreme scope of “ultrahig...
The `1-regularized Gaussian maximum likelihood estimator (MLE) has been shown to have strong statist...
<p>The use of sparse precision (inverse covariance) matrices has become popular because they allow f...
Thesis: S.M., Massachusetts Institute of Technology, Sloan School of Management, Operations Research...
We apply a method recently introduced to the statistical literature to directly estimate the precisi...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
We consider the problem of sparse precision matrix estimation in high dimensions using the CLIME est...
Abstract—Estimating large sparse precision matrices is an in-teresting and challenging problem in ma...
Estimating large sparse inverse covariance matrices (precision matrices) is an interesting and chall...
This paper focuses on exploring the sparsity of the inverse covariance matrix $\bSigma^{-1}$, or the...
We consider the problem of sparse precision matrix estimation in high dimensions using the CLIME est...
The estimation of inverse covariance matrix (also known as precision matrix) is an important proble...
Given n samples X1, X2,..., Xn from N(0,Σ), we are interested in estimating the p × p precision matr...
We consider the statistical inference for high-dimensional precision matrices. Specifically, we prop...
We propose a semiparametric procedure for estimating high dimensional sparse inverse covariance matr...