Abstract We introduce a novel geometry-informed irreversible perturbation that accelerates convergence of the Langevin algorithm for Bayesian computation. It is well documented that there exist perturbations to the Langevin dynamics that preserve its invariant measure while accelerating its convergence. Irreversible perturbations and reversible perturbations (such as Riemannian manifold Langevin dynamics (RMLD)) have separately been shown to improve the performance of Langevin samplers. We consider these two perturbations simultaneously by presenting a novel form of irreversible perturbation for RMLD that is informed by the underlying geometry. Through numerical examples, we show that this new irreversible perturbation can im...
To sample from distributions in high dimensional spaces or finite large sets di-rectly is not feasib...
It has been shown that the nonreversible overdamped Langevin dynamics enjoy better convergence prope...
In this thesis, we shall discuss the Langevin equation. While the equation is well known in Statisti...
In this paper we propose a new approach for sampling from probability measures in, possibly, high di...
International audienceIn this paper we propose a new approach for sampling from probability measures...
We propose a computational method (with acronym ALDI) for sampling from a given target distribution ...
International audienceGradient-descent-based algorithms and their stochastic versions have widesprea...
In this paper we introduce and analyse Langevin samplers that consist of perturbations of the standa...
In this paper, we explore a general Aggregated Gradient Langevin Dynamics framework (AGLD) for the M...
Langevin dynamics-based sampling algorithms are arguably among the most widelyused Markov Chain Mont...
Adaptive Langevin dynamics is a method for sampling the Boltzmann-Gibbs distribution at prescribed t...
This paper explores the application of methods from information geometry to the sequential Monte Car...
Abstract. In recent papers it has been demonstrated that sampling a Gibbs distribution from an appro...
Gradient-descent-based algorithms and their stochastic versions have widespread applications in mach...
International audienceGradient Langevin dynamics (GLD) and stochastic GLD (SGLD) have attracted cons...
To sample from distributions in high dimensional spaces or finite large sets di-rectly is not feasib...
It has been shown that the nonreversible overdamped Langevin dynamics enjoy better convergence prope...
In this thesis, we shall discuss the Langevin equation. While the equation is well known in Statisti...
In this paper we propose a new approach for sampling from probability measures in, possibly, high di...
International audienceIn this paper we propose a new approach for sampling from probability measures...
We propose a computational method (with acronym ALDI) for sampling from a given target distribution ...
International audienceGradient-descent-based algorithms and their stochastic versions have widesprea...
In this paper we introduce and analyse Langevin samplers that consist of perturbations of the standa...
In this paper, we explore a general Aggregated Gradient Langevin Dynamics framework (AGLD) for the M...
Langevin dynamics-based sampling algorithms are arguably among the most widelyused Markov Chain Mont...
Adaptive Langevin dynamics is a method for sampling the Boltzmann-Gibbs distribution at prescribed t...
This paper explores the application of methods from information geometry to the sequential Monte Car...
Abstract. In recent papers it has been demonstrated that sampling a Gibbs distribution from an appro...
Gradient-descent-based algorithms and their stochastic versions have widespread applications in mach...
International audienceGradient Langevin dynamics (GLD) and stochastic GLD (SGLD) have attracted cons...
To sample from distributions in high dimensional spaces or finite large sets di-rectly is not feasib...
It has been shown that the nonreversible overdamped Langevin dynamics enjoy better convergence prope...
In this thesis, we shall discuss the Langevin equation. While the equation is well known in Statisti...