A metric tensor for Riemann manifold Monte Carlo particularly suited for nonlinear Bayesian hierarchical models is proposed. The metric tensor is built from symmetric positive semidefinite log-density gradient covariance (LGC) matrices, which are also proposed and further explored here. The LGCs generalize the Fisher information matrix by measuring the joint information content and dependence structure of both a random variable and the parameters of said variable. Consequently, positive definite Fisher/LGC-based metric tensors may be constructed not only from the observation likelihoods as is current practice, but also from arbitrarily complicated nonlinear prior/latent variable structures, provided the LGC may be derived for each condition...
International audienceThis paper aims at providing an original Riemannian geometry to derive robust ...
The Bayesian approach to Inverse Problems relies predominantly on Markov Chain Monte Carlo methods f...
We introduce generalized partially linear models with covariates on Riemannian manifolds. These mode...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
This thesis presents novel Markov chain Monte Carlo methodology that exploits the natural representa...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
The paper proposes Metropolis adjusted Langevin and Hamiltonian Monte Carlo sampling methods defined...
Bayesian inference tells us how we can incorporate information from the data into the parameters. In...
The paper proposes a Riemannian Manifold Hamiltonian Monte Carlo sampler to resolve the shortcomings...
Stochastic-gradient sampling methods are often used to perform Bayesian inference on neural networks...
Recently, a novel Log-Euclidean Riemannian metric [28] is proposed for statistics on symmetric posit...
Multivariate categorical data are routinely collected in several applications, including epidemiolog...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
AbstractIn this technical note, we derive two MCMC (Markov chain Monte Carlo) samplers for dynamic c...
The current paper introduces new prior distributions on the univariate normal model, with the aim of...
International audienceThis paper aims at providing an original Riemannian geometry to derive robust ...
The Bayesian approach to Inverse Problems relies predominantly on Markov Chain Monte Carlo methods f...
We introduce generalized partially linear models with covariates on Riemannian manifolds. These mode...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
This thesis presents novel Markov chain Monte Carlo methodology that exploits the natural representa...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
The paper proposes Metropolis adjusted Langevin and Hamiltonian Monte Carlo sampling methods defined...
Bayesian inference tells us how we can incorporate information from the data into the parameters. In...
The paper proposes a Riemannian Manifold Hamiltonian Monte Carlo sampler to resolve the shortcomings...
Stochastic-gradient sampling methods are often used to perform Bayesian inference on neural networks...
Recently, a novel Log-Euclidean Riemannian metric [28] is proposed for statistics on symmetric posit...
Multivariate categorical data are routinely collected in several applications, including epidemiolog...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
AbstractIn this technical note, we derive two MCMC (Markov chain Monte Carlo) samplers for dynamic c...
The current paper introduces new prior distributions on the univariate normal model, with the aim of...
International audienceThis paper aims at providing an original Riemannian geometry to derive robust ...
The Bayesian approach to Inverse Problems relies predominantly on Markov Chain Monte Carlo methods f...
We introduce generalized partially linear models with covariates on Riemannian manifolds. These mode...