Efficiently accessing the information contained in non-linear and high dimensional probability distributions remains a core challenge in modern statistics. Traditionally, estimators that go beyond point estimates are either categorized as Variational Inference (VI) or Markov-Chain Monte-Carlo (MCMC) techniques. While MCMC methods that utilize the geometric properties of continuous probability distributions to increase their efficiency have been proposed, VI methods rarely use the geometry. This work aims to fill this gap and proposes geometric Variational Inference (geoVI), a method based on Riemannian geometry and the Fisher information metric. It is used to construct a coordinate transformation that relates the Riemannian manifold associa...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
We propose a theoretically justified and practically applicable slice sampling based Markov chain Mo...
Markov chain Monte Carlo (MCMC) is one of the most popular statistical inference methods in machine...
Efficiently accessing the information contained in non-linear and high dimensional probability distr...
We propose a novel Riemannian geometric framework for variational inference in Bayesian models based...
We propose a novel Riemannian geometric framework for variational inference in Bayesian models based...
This dissertation is an investigation into the intersections between differential geometry and Bayes...
We introduce the information geometry module of the Python package Geomstats. The module first imple...
When dealing with a parametric statistical model, a Riemannian manifold can naturally appear by endo...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
We develop Riemannian Stein Variational Gradient Descent (RSVGD), a Bayesian inference method that g...
Information geometry has emerged from investigating the geometrical structure of a family of probabi...
When considering probabilistic pattern recognition methods, especially methods based on Bayesian ana...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
We investigate the meaning of "statistical methods" for geometric inference based on image feature p...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
We propose a theoretically justified and practically applicable slice sampling based Markov chain Mo...
Markov chain Monte Carlo (MCMC) is one of the most popular statistical inference methods in machine...
Efficiently accessing the information contained in non-linear and high dimensional probability distr...
We propose a novel Riemannian geometric framework for variational inference in Bayesian models based...
We propose a novel Riemannian geometric framework for variational inference in Bayesian models based...
This dissertation is an investigation into the intersections between differential geometry and Bayes...
We introduce the information geometry module of the Python package Geomstats. The module first imple...
When dealing with a parametric statistical model, a Riemannian manifold can naturally appear by endo...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
We develop Riemannian Stein Variational Gradient Descent (RSVGD), a Bayesian inference method that g...
Information geometry has emerged from investigating the geometrical structure of a family of probabi...
When considering probabilistic pattern recognition methods, especially methods based on Bayesian ana...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
We investigate the meaning of "statistical methods" for geometric inference based on image feature p...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
We propose a theoretically justified and practically applicable slice sampling based Markov chain Mo...
Markov chain Monte Carlo (MCMC) is one of the most popular statistical inference methods in machine...