Variational Gaussian (VG) inference methods that optimize a lower bound to the marginal likelihood are a popular approach for Bayesian inference. A difficulty remains in computation of the lower bound when the latent dimensionality L is large. Even though the lower bound is concave for many models, its computation requires optimization over O(L2) variational parameters. Efficient reparameter-ization schemes can reduce the number of parameters, but give inaccurate solu-tions or destroy concavity leading to slow convergence. We propose decoupled variational inference that brings the best of both worlds together. First, it max-imizes a Lagrangian of the lower bound reducing the number of parameters to O(N), whereN is the number of data example...
We present a general method for deriving collapsed variational inference algo-rithms for probabilist...
Bilinear models of count data with Poisson distribution are popular in applications such as matrix f...
This paper introduces the $\textit{variational Rényi bound}$ (VR) that extends traditional variation...
Variational Gaussian (VG) inference methods that optimize a lower bound to the marginal likelihood a...
Two popular approaches to forming bounds in approximate Bayesian inference are local variational met...
How can we perform efficient inference and learning in directed probabilistic models, in the presenc...
This thesis focuses on the variational learning of latent Gaussian models for discrete data. The lea...
How can we perform efficient inference and learning in directed probabilistic models, in the presenc...
The results in this thesis are based on applications of the expectation propagation algorithm to app...
We investigate a local reparameterizaton technique for greatly reducing the variance of stochastic g...
We present a novel method for approximate inference. Using some of the constructs from expectation p...
Latent Gaussian models (LGMs) are widely used in statistics and machine learning. Bayesian inference...
We show how variational Bayesian inference can be implemented for very large general-ized linear mod...
Variational inference is a popular alternative to Markov chain Monte Carlo methods that constructs ...
We present a general method for deriving collapsed variational inference algorithms for probabilisti...
We present a general method for deriving collapsed variational inference algo-rithms for probabilist...
Bilinear models of count data with Poisson distribution are popular in applications such as matrix f...
This paper introduces the $\textit{variational Rényi bound}$ (VR) that extends traditional variation...
Variational Gaussian (VG) inference methods that optimize a lower bound to the marginal likelihood a...
Two popular approaches to forming bounds in approximate Bayesian inference are local variational met...
How can we perform efficient inference and learning in directed probabilistic models, in the presenc...
This thesis focuses on the variational learning of latent Gaussian models for discrete data. The lea...
How can we perform efficient inference and learning in directed probabilistic models, in the presenc...
The results in this thesis are based on applications of the expectation propagation algorithm to app...
We investigate a local reparameterizaton technique for greatly reducing the variance of stochastic g...
We present a novel method for approximate inference. Using some of the constructs from expectation p...
Latent Gaussian models (LGMs) are widely used in statistics and machine learning. Bayesian inference...
We show how variational Bayesian inference can be implemented for very large general-ized linear mod...
Variational inference is a popular alternative to Markov chain Monte Carlo methods that constructs ...
We present a general method for deriving collapsed variational inference algorithms for probabilisti...
We present a general method for deriving collapsed variational inference algo-rithms for probabilist...
Bilinear models of count data with Poisson distribution are popular in applications such as matrix f...
This paper introduces the $\textit{variational Rényi bound}$ (VR) that extends traditional variation...