Gaussian graphical models can capture complex dependency structures amongst variables. For such models, Bayesian inference is attractive as it provides principled ways to incorporate prior information and to quantify uncertainty through the posterior distribution. However, posterior computation under the conjugate G-Wishart prior distribution on the precision matrix is expensive for general non-decomposable graphs. We therefore propose a new Markov chain Monte Carlo (MCMC) method named the G-Wishart weighted proposal algorithm (WWA). WWA's distinctive features include delayed acceptance MCMC, Gibbs updates for the precision matrix and an informed proposal distribution on the graph space that enables embarrassingly parallel computat...
Bayesian inference of Gibbs random fields (GRFs) is often referred to as a doubly intractable proble...
We introduce and exemplify an efficient method for direct sampling from hyper-inverse Wishart distri...
This thesis consists of four papers studying structure learning and Bayesian inference in probabilis...
Gaussian graphical models can capture complex dependency structures amongst variables. For such mod...
This thesis contributes to the field of Gaussian Graphical Models by exploring either numerically or...
Gaussian graphical models (GGMs) are a popular tool to learn the dependence structure in the form of...
The grouped independence Metropolis–Hastings (GIMH) and Markov chain within Metropolis (MCWM) algori...
In this paper we propose a method to calculate the posterior probability of a nondecomposable graphi...
This paper presents a default model-selection procedure for Gaussian graphical models that involves ...
We consider the Bayesian analysis of undirected graphical Gaussian models with edges and vertices sy...
A centred Gaussian model that is Markov with respect to an undirected graph G is characterised by th...
This paper presents a default model-selection procedure for Gaussian graphical models that involves ...
The Gaussian Graphical Model (GGM) is a popular tool for incorporating sparsity into joint multivari...
Decoding complex relationships among large numbers of variables with relatively few observations is ...
Deriving Bayesian inference for exponential random graph models (ERGMs) is a challenging “doubly int...
Bayesian inference of Gibbs random fields (GRFs) is often referred to as a doubly intractable proble...
We introduce and exemplify an efficient method for direct sampling from hyper-inverse Wishart distri...
This thesis consists of four papers studying structure learning and Bayesian inference in probabilis...
Gaussian graphical models can capture complex dependency structures amongst variables. For such mod...
This thesis contributes to the field of Gaussian Graphical Models by exploring either numerically or...
Gaussian graphical models (GGMs) are a popular tool to learn the dependence structure in the form of...
The grouped independence Metropolis–Hastings (GIMH) and Markov chain within Metropolis (MCWM) algori...
In this paper we propose a method to calculate the posterior probability of a nondecomposable graphi...
This paper presents a default model-selection procedure for Gaussian graphical models that involves ...
We consider the Bayesian analysis of undirected graphical Gaussian models with edges and vertices sy...
A centred Gaussian model that is Markov with respect to an undirected graph G is characterised by th...
This paper presents a default model-selection procedure for Gaussian graphical models that involves ...
The Gaussian Graphical Model (GGM) is a popular tool for incorporating sparsity into joint multivari...
Decoding complex relationships among large numbers of variables with relatively few observations is ...
Deriving Bayesian inference for exponential random graph models (ERGMs) is a challenging “doubly int...
Bayesian inference of Gibbs random fields (GRFs) is often referred to as a doubly intractable proble...
We introduce and exemplify an efficient method for direct sampling from hyper-inverse Wishart distri...
This thesis consists of four papers studying structure learning and Bayesian inference in probabilis...