We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling from posterior distributions defined on general Riemannian manifolds. We apply this new algorithm to Bayesian inference on symmetric or Hermitian positive definite (PD) matrices. To do so, we exploit the Riemannian structure induced by Cartan's canonical metric. The geodesics that correspond to this metric are available in closed-form and – within the context of Lagrangian Monte Carlo – provide a principled way to travel around the space of PD matrices. Our method improves Bayesian inference on such matrices by allowing for a broad range of priors, so we are not limited to conjugate priors only. In the context of spectral density estimation, we ...
Abstract. We consider the Riemann manifold Hamiltonian Monte Carlo (RMHMC) method for solving statis...
Nonparametric density estimation on Riemannian surfaces is performed by inducing a prior through a l...
In this paper we address the widely-experienced difficulty in tuning Hamiltonian-based Monte Carlo s...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
This dissertation is an investigation into the intersections between differential geometry and Bayes...
Markov chain Monte Carlo methods explicitly defined on the manifold of probability distributions hav...
The paper proposes a Riemannian Manifold Hamiltonian Monte Carlo sampler to resolve the shortcomings...
This thesis presents novel Markov chain Monte Carlo methodology that exploits the natural representa...
We consider the Riemann manifold Hamiltonian Monte Carlo (RMHMC) method for solving statistical inve...
We consider Bayesian analysis on high-dimensional spheres with angular central Gaussian priors. Thes...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
We propose a theoretically justified and practically applicable slice sampling based Markov chain Mo...
A metric tensor for Riemann manifold Monte Carlo particularly suited for nonlinear Bayesian hierarch...
Abstract. We consider the Riemann manifold Hamiltonian Monte Carlo (RMHMC) method for solving statis...
Abstract. We consider the Riemann manifold Hamiltonian Monte Carlo (RMHMC) method for solving statis...
Nonparametric density estimation on Riemannian surfaces is performed by inducing a prior through a l...
In this paper we address the widely-experienced difficulty in tuning Hamiltonian-based Monte Carlo s...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
We present geodesic Lagrangian Monte Carlo, an extension of Hamiltonian Monte Carlo for sampling fro...
This dissertation is an investigation into the intersections between differential geometry and Bayes...
Markov chain Monte Carlo methods explicitly defined on the manifold of probability distributions hav...
The paper proposes a Riemannian Manifold Hamiltonian Monte Carlo sampler to resolve the shortcomings...
This thesis presents novel Markov chain Monte Carlo methodology that exploits the natural representa...
We consider the Riemann manifold Hamiltonian Monte Carlo (RMHMC) method for solving statistical inve...
We consider Bayesian analysis on high-dimensional spheres with angular central Gaussian priors. Thes...
The efficiency of Markov Chain Monte Carlo (MCMC) depends on how the underlying geometry of the prob...
We propose a theoretically justified and practically applicable slice sampling based Markov chain Mo...
A metric tensor for Riemann manifold Monte Carlo particularly suited for nonlinear Bayesian hierarch...
Abstract. We consider the Riemann manifold Hamiltonian Monte Carlo (RMHMC) method for solving statis...
Abstract. We consider the Riemann manifold Hamiltonian Monte Carlo (RMHMC) method for solving statis...
Nonparametric density estimation on Riemannian surfaces is performed by inducing a prior through a l...
In this paper we address the widely-experienced difficulty in tuning Hamiltonian-based Monte Carlo s...