Published with license by Taylor & Francis Group, LLC. The use of sparse precision (inverse covariance) matrices has become popular because they allow for efficient algorithms for joint inference in high-dimensional models. Many applications require the computation of certain elements of the covariance matrix, such as the marginal variances, which may be nontrivial to obtain when the dimension is large. This article introduces a fast Rao–Blackwellized Monte Carlo sampling-based method for efficiently approximating selected elements of the covariance matrix. The variance and confidence bounds of the approximations can be precisely estimated without additional computational costs. Furthermore, a method that iterates over subdomains is int...
We apply a method recently introduced to the statistical literature to directly estimate the precisi...
The performance of Markov chain Monte Carlo (MCMC) algorithms like the Metropolis Hastings Random Wa...
The dependency structure of multivariate data can be analyzed using the covariance matrix. In many f...
The use of sparse precision (inverse covariance) matrices has become popular because they allow for ...
International audienceWe present an open-source library implementing fast algorithms for covari-ance...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
This paper focuses on exploring the sparsity of the inverse covariance matrix $\bSigma^{-1}$, or the...
The ℓ1-regularized Gaussian maximum likelihood method is a common approach for sparse precision matr...
We introduce nonparametric regularization of the eigenvalues of a sample covariance matrix through s...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
In this article, we focus on the estimation of a high-dimensional inverse covariance (i.e., precisio...
Estimation of inverse covariance matrices, known as precision matrices, is important in various area...
Estimation of sparse covariance matrices and their inverse subject to positive definiteness constrai...
Thesis: S.M., Massachusetts Institute of Technology, Sloan School of Management, Operations Research...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
We apply a method recently introduced to the statistical literature to directly estimate the precisi...
The performance of Markov chain Monte Carlo (MCMC) algorithms like the Metropolis Hastings Random Wa...
The dependency structure of multivariate data can be analyzed using the covariance matrix. In many f...
The use of sparse precision (inverse covariance) matrices has become popular because they allow for ...
International audienceWe present an open-source library implementing fast algorithms for covari-ance...
This paper studies the sparsistency and rates of convergence for estimating sparse covariance and pr...
This paper focuses on exploring the sparsity of the inverse covariance matrix $\bSigma^{-1}$, or the...
The ℓ1-regularized Gaussian maximum likelihood method is a common approach for sparse precision matr...
We introduce nonparametric regularization of the eigenvalues of a sample covariance matrix through s...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
In this article, we focus on the estimation of a high-dimensional inverse covariance (i.e., precisio...
Estimation of inverse covariance matrices, known as precision matrices, is important in various area...
Estimation of sparse covariance matrices and their inverse subject to positive definiteness constrai...
Thesis: S.M., Massachusetts Institute of Technology, Sloan School of Management, Operations Research...
This paper studies estimation of covariance matrices with conditional sparse structure. We overcome ...
We apply a method recently introduced to the statistical literature to directly estimate the precisi...
The performance of Markov chain Monte Carlo (MCMC) algorithms like the Metropolis Hastings Random Wa...
The dependency structure of multivariate data can be analyzed using the covariance matrix. In many f...