In this paper we introduce and analyse Langevin samplers that consist of perturbations of the standard underdamped Langevin dynamics. The perturbed dynamics is such that its invariant measure is the same as that of the unperturbed dynamics. We show that appropriate choices of the perturbations can lead to samplers that have improved properties, at least in terms of reducing the asymptotic variance. We present a detailed analysis of the new Langevin sampler for Gaussian target distributions. Our theoretical results are supported by numerical experiments with non-Gaussian target measures
Sampling from probability distributions is a problem of significant importance in Statistics and Mac...
Calculating averages with respect to multimodal probability distributions is often necessary in appl...
In this manuscript, we consider the Langevin dynamics with an overdamped vector field and driven by ...
In this paper, we propose a new approach for sampling from probability measures in, possibly, high-d...
International audienceIn this paper we propose a new approach for sampling from probability measures...
Abstract. Monte Carlo methods are a popular tool to sample from high-dimensional target distri-butio...
We study the problem of sampling from a probability distribution π on Rd which has a density w.r.t. ...
We propose a computational method (with acronym ALDI) for sampling from a given target distribution ...
This dissertation is devoted to studying two different problems: the over-damped asymp- totics of La...
Adaptive Langevin dynamics is a method for sampling the Boltzmann-Gibbs distribution at prescribed t...
We study an overdamped Langevin equation on the $d$-dimensional torus with stationary distribution p...
In this work we consider the unbiased estimation of expectations w.r.t.~probability measures that ha...
Langevin dynamics-based sampling algorithms are arguably among the most widelyused Markov Chain Mont...
This thesis focuses on the problem of sampling in high dimension and is based on the unadjusted Lang...
International audienceWe consider numerical methods for thermodynamic sampling, i.e. computing seque...
Sampling from probability distributions is a problem of significant importance in Statistics and Mac...
Calculating averages with respect to multimodal probability distributions is often necessary in appl...
In this manuscript, we consider the Langevin dynamics with an overdamped vector field and driven by ...
In this paper, we propose a new approach for sampling from probability measures in, possibly, high-d...
International audienceIn this paper we propose a new approach for sampling from probability measures...
Abstract. Monte Carlo methods are a popular tool to sample from high-dimensional target distri-butio...
We study the problem of sampling from a probability distribution π on Rd which has a density w.r.t. ...
We propose a computational method (with acronym ALDI) for sampling from a given target distribution ...
This dissertation is devoted to studying two different problems: the over-damped asymp- totics of La...
Adaptive Langevin dynamics is a method for sampling the Boltzmann-Gibbs distribution at prescribed t...
We study an overdamped Langevin equation on the $d$-dimensional torus with stationary distribution p...
In this work we consider the unbiased estimation of expectations w.r.t.~probability measures that ha...
Langevin dynamics-based sampling algorithms are arguably among the most widelyused Markov Chain Mont...
This thesis focuses on the problem of sampling in high dimension and is based on the unadjusted Lang...
International audienceWe consider numerical methods for thermodynamic sampling, i.e. computing seque...
Sampling from probability distributions is a problem of significant importance in Statistics and Mac...
Calculating averages with respect to multimodal probability distributions is often necessary in appl...
In this manuscript, we consider the Langevin dynamics with an overdamped vector field and driven by ...