Mean-field variational methods are widely used for approximate posterior inference in many probabilistic models. In a typical application, mean-field methods approximately compute the posterior with a coordinate-ascent optimization algorithm. When the model is conditionally conjugate, the coordinate updates are easily derived and in closed form. However, many models of interest---like the correlated topic model and Bayesian logistic regression---are nonconjugate. In these models, mean-field methods cannot be directly applied and practitioners have had to develop variational algorithms on a case-by-case basis. In this paper, we develop two generic methods for nonconjugate models, Laplace variational inference and delta method variational inf...
Variational inference is one of the tools that now lies at the heart of the modern data analysis lif...
We consider a logistic regression model with a Gaussian prior distribution over the parameters. We s...
We propose a new variational inference method based on a proximal framework that uses the Kullback-L...
Mean-field variational methods are widely used for approximate posterior inference in many prob-abil...
Mean-field variational methods are widely used for approximate posterior inference in many prob-abil...
We propose a simple and effective variational inference algorithm based on stochastic optimi-sation ...
Variational Bayes (VB) is a common strategy for approximate Bayesian inference, but simple methods a...
Abstract. The article describe the model, derivation, and implementation of variational Bayesian inf...
We present a non-factorized variational method for full posterior inference in Bayesian hierarchical...
Variational methods are widely used for approximate posterior inference. However, their use is typic...
This tutorial describes the mean-field variational Bayesian approximation to inference in graphical ...
Variational Inference (VI) has become a popular technique to approximate difficult-to-compute poster...
Mean-field variational inference is a method for approximate Bayesian posterior inference. It approx...
The central objective of this thesis is to develop new algorithms for inference in probabilistic gra...
The Bayesian framework for machine learning allows for the incorporation of prior knowledge in a coh...
Variational inference is one of the tools that now lies at the heart of the modern data analysis lif...
We consider a logistic regression model with a Gaussian prior distribution over the parameters. We s...
We propose a new variational inference method based on a proximal framework that uses the Kullback-L...
Mean-field variational methods are widely used for approximate posterior inference in many prob-abil...
Mean-field variational methods are widely used for approximate posterior inference in many prob-abil...
We propose a simple and effective variational inference algorithm based on stochastic optimi-sation ...
Variational Bayes (VB) is a common strategy for approximate Bayesian inference, but simple methods a...
Abstract. The article describe the model, derivation, and implementation of variational Bayesian inf...
We present a non-factorized variational method for full posterior inference in Bayesian hierarchical...
Variational methods are widely used for approximate posterior inference. However, their use is typic...
This tutorial describes the mean-field variational Bayesian approximation to inference in graphical ...
Variational Inference (VI) has become a popular technique to approximate difficult-to-compute poster...
Mean-field variational inference is a method for approximate Bayesian posterior inference. It approx...
The central objective of this thesis is to develop new algorithms for inference in probabilistic gra...
The Bayesian framework for machine learning allows for the incorporation of prior knowledge in a coh...
Variational inference is one of the tools that now lies at the heart of the modern data analysis lif...
We consider a logistic regression model with a Gaussian prior distribution over the parameters. We s...
We propose a new variational inference method based on a proximal framework that uses the Kullback-L...