International audienceThe dimension and the complexity of inference problems have dramatically increased in statistical signal processing. It thus becomes mandatory to design improved proposal schemes in Metropolis-Hastings algorithms, providing large proposal transitions that are accepted with high probability. The proposal density should ideally provide an accurate approximation of the target density with a low computational cost. In this paper, we derive a novel Metropolis-Hastings proposal, inspired from Langevin dynamics, where the drift term is preconditioned by an adaptive matrix constructed through a Majorization-Minimization strategy. We propose several variants of low-complexity curvature metrics applicable to large scale problems...
Gradient-descent-based algorithms and their stochastic versions have widespread applications in mach...
International audienceIn Bayesian inference, a statistical model is assumed between an unknown vecto...
Global fits of physics models require efficient methods for exploring high-dimensional and/or multim...
International audienceThe dimension and the complexity of inference problems have dramatically incre...
International audienceIn this paper, we derive a novel MH proposal, inspired from Langevin dynamics,...
International audienceOne challenging task in MCMC methods is the choice of the proposal density. It...
We consider a class of adaptive MCMC algorithms using a Langevin-type proposal density. We prove th...
The Metropolis-adjusted Langevin (MALA) algorithm is a sampling algorithm which makes local moves by...
Bayesian inference via standard Markov Chain Monte Carlo (MCMC) methods such as Metropolis-Hastings ...
In this paper, we study the computational complexity of sampling from a Bayesian posterior (or pseud...
Over the last decades, various “non-linear” MCMC methods have arisen. While appealing for their conv...
We consider the application of active subspaces to inform a Metropolis-Hastings algorithm, thereby a...
We introduce new Gaussian proposals to improve the efficiency of the standard Hastings-Metropolis al...
International audiencePopulation Monte Carlo (PMC) algorithms are a family of adaptive importance sa...
We introduce a new framework for efficient sampling from complex probability distributions, using a ...
Gradient-descent-based algorithms and their stochastic versions have widespread applications in mach...
International audienceIn Bayesian inference, a statistical model is assumed between an unknown vecto...
Global fits of physics models require efficient methods for exploring high-dimensional and/or multim...
International audienceThe dimension and the complexity of inference problems have dramatically incre...
International audienceIn this paper, we derive a novel MH proposal, inspired from Langevin dynamics,...
International audienceOne challenging task in MCMC methods is the choice of the proposal density. It...
We consider a class of adaptive MCMC algorithms using a Langevin-type proposal density. We prove th...
The Metropolis-adjusted Langevin (MALA) algorithm is a sampling algorithm which makes local moves by...
Bayesian inference via standard Markov Chain Monte Carlo (MCMC) methods such as Metropolis-Hastings ...
In this paper, we study the computational complexity of sampling from a Bayesian posterior (or pseud...
Over the last decades, various “non-linear” MCMC methods have arisen. While appealing for their conv...
We consider the application of active subspaces to inform a Metropolis-Hastings algorithm, thereby a...
We introduce new Gaussian proposals to improve the efficiency of the standard Hastings-Metropolis al...
International audiencePopulation Monte Carlo (PMC) algorithms are a family of adaptive importance sa...
We introduce a new framework for efficient sampling from complex probability distributions, using a ...
Gradient-descent-based algorithms and their stochastic versions have widespread applications in mach...
International audienceIn Bayesian inference, a statistical model is assumed between an unknown vecto...
Global fits of physics models require efficient methods for exploring high-dimensional and/or multim...