In this article we present an approach to rank edges in a network modeled through a Gaussian Graphical Model. We obtain a path of precision matrices such that, in each step of the procedure, an edge is added. We also guarantee that the matrices along the path are symmetric and positive definite. To select the edges, we estimate the covariates that have the largest absolute correlation with a node conditional to the set of edges estimated in previous iterations. Simulation studies show that the procedure is able to detect true edges until the sparsity level of the population network is recovered. Moreover, it can add efficiently true edges in the first iterations avoiding to enter false ones. We show that the top-rank edges are associated wi...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
We present two methodologies to deal with high-dimensional data with mixed variables, the strongly d...
We introduce Graphical TREX (GTREX), a novel method for graph estimation in high-dimensional Gaussia...
In this article we present an approach to rank edges in a network modeled through a Gaussian Graphic...
<div><p>We propose a model selection algorithm for high-dimensional clustered data. Our algorithm co...
Many problems of practical interest can be represented by graphs. In practice, each edge of a graph ...
We consider the problem of Ising and Gaussian graphical model selection given n i.i.d. samples from ...
An open problem in graphical Gaussian models is to determine the smallest number of observations nee...
We present a physically inspired model and an efficient algorithm to infer hierarchical rankings of ...
<p>Gaussian graphical models represent the underlying graph structure of conditional dependence betw...
We consider the problem of high-dimensional Gaussian graphical model selection. We identify a set o...
Thesis (Ph.D.)--University of Washington, 2015The topic of learning matrix structures in the emph{hi...
We consider the problem of learning a high-dimensional graphical model in which certain hub nodes ar...
Graph is a natural representation of network data. Over the decades many researches have been conduc...
We consider the problem of estimating a sparse dynamic Gaussian graphical model with L1 penalized ma...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
We present two methodologies to deal with high-dimensional data with mixed variables, the strongly d...
We introduce Graphical TREX (GTREX), a novel method for graph estimation in high-dimensional Gaussia...
In this article we present an approach to rank edges in a network modeled through a Gaussian Graphic...
<div><p>We propose a model selection algorithm for high-dimensional clustered data. Our algorithm co...
Many problems of practical interest can be represented by graphs. In practice, each edge of a graph ...
We consider the problem of Ising and Gaussian graphical model selection given n i.i.d. samples from ...
An open problem in graphical Gaussian models is to determine the smallest number of observations nee...
We present a physically inspired model and an efficient algorithm to infer hierarchical rankings of ...
<p>Gaussian graphical models represent the underlying graph structure of conditional dependence betw...
We consider the problem of high-dimensional Gaussian graphical model selection. We identify a set o...
Thesis (Ph.D.)--University of Washington, 2015The topic of learning matrix structures in the emph{hi...
We consider the problem of learning a high-dimensional graphical model in which certain hub nodes ar...
Graph is a natural representation of network data. Over the decades many researches have been conduc...
We consider the problem of estimating a sparse dynamic Gaussian graphical model with L1 penalized ma...
The thesis considers the estimation of sparse precision matrices in the highdimensional setting. Fir...
We present two methodologies to deal with high-dimensional data with mixed variables, the strongly d...
We introduce Graphical TREX (GTREX), a novel method for graph estimation in high-dimensional Gaussia...