We study maximum likelihood estimation in Gaussian graphical models from a geometric point of view. An algebraic elimination criterion allows us to find exact lower bounds on the number of observations needed to ensure that the maximum likelihood estimator (MLE) exists with probability one. This is applied to bipartite graphs, grids and colored graphs. We also study the ML degree, and we present the first instance of a graph for which the MLE exists with probability one, even when the number of observations equals the treewidth
Summary. We introduce new types of graphical Gaussian models by placing symmetry restrictions on the...
We consider the problem of estimating the parameters of a Gaussian or binary distribution in such a ...
This thesis contributes to the field of Gaussian Graphical Models by exploring either numerically or...
Algebraic statistics exploits the use of algebraic techniques to develop new paradigms and algorithm...
We describe algorithms for maximum likelihood estimation of Gaussian graphical models with condition...
An open problem in graphical Gaussian models is to determine the smallest number of observations nee...
In this paper we discuss maximum likelihood estimation when some observations are missing in mixed g...
© 2019 Institute of Mathematical Statistics. We analyze the problem of maximum likelihood estimation...
Thesis (Ph. D.)--University of Washington, 2004Graphical Markov models use graphs to represent depen...
In this paper we discuss maximum likelihood estimation when some observations are missing in mixed g...
In this article, we combine results from the theory of linear exponential families, polyhedral geome...
We consider distributed estimation of the inverse covariance matrix, also called the concentration o...
The andersson–madigan–perlman (amp) markov property is a recently proposed alternative markov proper...
We consider distributed estimation of the inverse co-variance matrix, also called the concentration ...
We propose penalized likelihood methods for estimating the concentration matrix in the Gaussian grap...
Summary. We introduce new types of graphical Gaussian models by placing symmetry restrictions on the...
We consider the problem of estimating the parameters of a Gaussian or binary distribution in such a ...
This thesis contributes to the field of Gaussian Graphical Models by exploring either numerically or...
Algebraic statistics exploits the use of algebraic techniques to develop new paradigms and algorithm...
We describe algorithms for maximum likelihood estimation of Gaussian graphical models with condition...
An open problem in graphical Gaussian models is to determine the smallest number of observations nee...
In this paper we discuss maximum likelihood estimation when some observations are missing in mixed g...
© 2019 Institute of Mathematical Statistics. We analyze the problem of maximum likelihood estimation...
Thesis (Ph. D.)--University of Washington, 2004Graphical Markov models use graphs to represent depen...
In this paper we discuss maximum likelihood estimation when some observations are missing in mixed g...
In this article, we combine results from the theory of linear exponential families, polyhedral geome...
We consider distributed estimation of the inverse covariance matrix, also called the concentration o...
The andersson–madigan–perlman (amp) markov property is a recently proposed alternative markov proper...
We consider distributed estimation of the inverse co-variance matrix, also called the concentration ...
We propose penalized likelihood methods for estimating the concentration matrix in the Gaussian grap...
Summary. We introduce new types of graphical Gaussian models by placing symmetry restrictions on the...
We consider the problem of estimating the parameters of a Gaussian or binary distribution in such a ...
This thesis contributes to the field of Gaussian Graphical Models by exploring either numerically or...