We propose maximum likelihood estimation for learning Gaussian graphical models with a Gaussian (ℓ[2 over 2]) prior on the parameters. This is in contrast to the commonly used Laplace (ℓ[subscript 1) prior for encouraging sparseness. We show that our optimization problem leads to a Riccati matrix equation, which has a closed form solution. We propose an efficient algorithm that performs a singular value decomposition of the training data. Our algorithm is O(NT[superscript 2])-time and O(NT)-space for N variables and T samples. Our method is tailored to high-dimensional problems (N >> T), in which sparseness promoting methods become intractable. Furthermore, instead of obtaining a single solution for a specific regularization parameter, our ...
We propose Bayesian methods for estimating the precision matrix in Gaussian graphical models. The me...
We consider the problem of estimating a sparse dynamic Gaussian graphical model with L1 penalized ma...
In this article, we focus on the estimation of a high-dimensional inverse covariance (i.e., precisio...
In this paper we consider the task of esti-mating the non-zero pattern of the sparse in-verse covari...
This thesis develops methodology and asymptotic analysis for sparse estimators of the covariance mat...
We consider the problem of fitting a large-scale covariance matrix to multivariate Gaussian data in ...
Gaussian graphical models are of great interest in statistical learning. Because the conditional ind...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
One of the fundamental tasks in science is to find explainable relationships between observed pheno...
In recent years, the problem of estimating a sparse inverse covariance matrix in the moderate-to-lar...
International audienceThis paper is devoted to the problem of sampling Gaussian distributions in hig...
Several methods have been recently proposed for estimating sparse Gaussian graphical models using `1...
We consider the problem of estimating a sparse Gaussian Graphical Model with a special graph topolog...
Abstract We consider the maximum likelihood estimation of sparse inverse covariance matrices. We de...
Fitting high-dimensional data involves a delicate tradeoff between faithful representation and the u...
We propose Bayesian methods for estimating the precision matrix in Gaussian graphical models. The me...
We consider the problem of estimating a sparse dynamic Gaussian graphical model with L1 penalized ma...
In this article, we focus on the estimation of a high-dimensional inverse covariance (i.e., precisio...
In this paper we consider the task of esti-mating the non-zero pattern of the sparse in-verse covari...
This thesis develops methodology and asymptotic analysis for sparse estimators of the covariance mat...
We consider the problem of fitting a large-scale covariance matrix to multivariate Gaussian data in ...
Gaussian graphical models are of great interest in statistical learning. Because the conditional ind...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
One of the fundamental tasks in science is to find explainable relationships between observed pheno...
In recent years, the problem of estimating a sparse inverse covariance matrix in the moderate-to-lar...
International audienceThis paper is devoted to the problem of sampling Gaussian distributions in hig...
Several methods have been recently proposed for estimating sparse Gaussian graphical models using `1...
We consider the problem of estimating a sparse Gaussian Graphical Model with a special graph topolog...
Abstract We consider the maximum likelihood estimation of sparse inverse covariance matrices. We de...
Fitting high-dimensional data involves a delicate tradeoff between faithful representation and the u...
We propose Bayesian methods for estimating the precision matrix in Gaussian graphical models. The me...
We consider the problem of estimating a sparse dynamic Gaussian graphical model with L1 penalized ma...
In this article, we focus on the estimation of a high-dimensional inverse covariance (i.e., precisio...