International audienceThis paper presents a detailed theoretical analysis of the Langevin Monte Carlo sampling algorithm recently introduced in [DMP16] when applied to log-concave probability distributions that are restricted to a convex body K. This method relies on a regularisation procedure involving the Moreau-Yosida envelope of the indicator function associated with K. Explicit convergence bounds in total variation norm and in Wasserstein distance of order 1 are established. In particular, we show that the complexity of this algorithm given a first order oracle is polynomial in the dimension of the state space. Finally, some numerical experiments are presented to compare our method with competing MCMC approaches from the literature
International audienceIn this paper, we propose algorithms for sampling from the distributions whose...
The class of logconcave functions in R n is a common generalization of Gaussians and of indicator fu...
International audienceWe derive explicit bounds for the computation of normalizing constants Z for l...
International audienceThis paper presents a detailed theoretical analysis of the Langevin Monte Carl...
International audienceWe extend the Langevin Monte Carlo (LMC) algorithm to compactly supported meas...
International audienceIn this paper, two new algorithms to sample from possibly non-smooth log-conca...
A well-known first-order method for sampling from log-concave probability distributions is the Unadj...
This paper presents two new Langevin Markov chain Monte Carlo methods that use con-vex analysis to s...
For sampling from a log-concave density, we study implicit integrators resulting from θ- method disc...
Sampling from probability distributions is a problem of significant importance in Statistics and Mac...
The first part of this thesis concerns the inference of un-normalized statistical models. We study t...
In Statistics, log-concave density estimation is a central problem within the field of nonparametric...
We study the adaptation properties of the multivariate log-concave maximum likelihood estimator over...
The estimation of a log-concave density on Rd represents a central problem in the area of nonparamet...
International audienceIn this paper, we propose algorithms for sampling from the distributions whose...
The class of logconcave functions in R n is a common generalization of Gaussians and of indicator fu...
International audienceWe derive explicit bounds for the computation of normalizing constants Z for l...
International audienceThis paper presents a detailed theoretical analysis of the Langevin Monte Carl...
International audienceWe extend the Langevin Monte Carlo (LMC) algorithm to compactly supported meas...
International audienceIn this paper, two new algorithms to sample from possibly non-smooth log-conca...
A well-known first-order method for sampling from log-concave probability distributions is the Unadj...
This paper presents two new Langevin Markov chain Monte Carlo methods that use con-vex analysis to s...
For sampling from a log-concave density, we study implicit integrators resulting from θ- method disc...
Sampling from probability distributions is a problem of significant importance in Statistics and Mac...
The first part of this thesis concerns the inference of un-normalized statistical models. We study t...
In Statistics, log-concave density estimation is a central problem within the field of nonparametric...
We study the adaptation properties of the multivariate log-concave maximum likelihood estimator over...
The estimation of a log-concave density on Rd represents a central problem in the area of nonparamet...
International audienceIn this paper, we propose algorithms for sampling from the distributions whose...
The class of logconcave functions in R n is a common generalization of Gaussians and of indicator fu...
International audienceWe derive explicit bounds for the computation of normalizing constants Z for l...