We introduce a variant of the Hybrid Monte Carlo (HMC) algorithm to address large deviation statistics in stochastic hydrodynamics. Based on the path integral approach to stochastic (partial) differential equations, our HMC algorithm samples space-time histories of the dynamical degrees of freedom under the influence of random noise. First, we validate and benchmark the HMC algorithm by reproducing multi-scale properties of the one-dimensional Burgers equation driven by Gaussian and white-in-time noise. Second, we show how to implement an importance sampling protocol to significantly enhance, by order-of-magnitudes, the probability to sample extreme and rare events, making it possible for the first time to estimate moments of field variable...
AbstractIn this work we investigate the interplay of almost sure and mean-square stability for linea...
Recently (Cérou et al., 2002) developed an elegant factorization of rare event probabilities appeari...
The paper proposes Metropolis adjusted Langevin and Hamiltonian Monte Carlo sampling methods defined...
We introduce a variant of the Hybrid Monte Carlo (HMC) algorithm to address large deviation statisti...
We introduce a variant of the Hybrid Monte Carlo (HMC) algorithm to address large-deviation statisti...
We present novel sequential Monte Carlo (SMC) algorithms for the simulation of two broad classes of ...
Rare events play a crucial role in our society and a great effort has been dedicated to numerically ...
The stochastic-gauge representation is a method of mapping the equation of motion for the quantum me...
Abstract. We present novel sequential Monte Carlo (SMC) algorithms for the simulation of two broad c...
We study the problem of estimating small reachability probabilities for large scale stochastic hybri...
International audienceProbability measures supported on submanifolds can be sampled by adding an ext...
The paper proposes a Riemannian Manifold Hamiltonian Monte Carlo sampler to resolve the shortcomings...
Generating random samples from a prescribed distribution is one of the most important and challengin...
The stochastic-gauge representation is a method of mapping the equation of motion for the quantum me...
An event that occurs infrequently is called a “rare event.” Some rare events can be of significant i...
AbstractIn this work we investigate the interplay of almost sure and mean-square stability for linea...
Recently (Cérou et al., 2002) developed an elegant factorization of rare event probabilities appeari...
The paper proposes Metropolis adjusted Langevin and Hamiltonian Monte Carlo sampling methods defined...
We introduce a variant of the Hybrid Monte Carlo (HMC) algorithm to address large deviation statisti...
We introduce a variant of the Hybrid Monte Carlo (HMC) algorithm to address large-deviation statisti...
We present novel sequential Monte Carlo (SMC) algorithms for the simulation of two broad classes of ...
Rare events play a crucial role in our society and a great effort has been dedicated to numerically ...
The stochastic-gauge representation is a method of mapping the equation of motion for the quantum me...
Abstract. We present novel sequential Monte Carlo (SMC) algorithms for the simulation of two broad c...
We study the problem of estimating small reachability probabilities for large scale stochastic hybri...
International audienceProbability measures supported on submanifolds can be sampled by adding an ext...
The paper proposes a Riemannian Manifold Hamiltonian Monte Carlo sampler to resolve the shortcomings...
Generating random samples from a prescribed distribution is one of the most important and challengin...
The stochastic-gauge representation is a method of mapping the equation of motion for the quantum me...
An event that occurs infrequently is called a “rare event.” Some rare events can be of significant i...
AbstractIn this work we investigate the interplay of almost sure and mean-square stability for linea...
Recently (Cérou et al., 2002) developed an elegant factorization of rare event probabilities appeari...
The paper proposes Metropolis adjusted Langevin and Hamiltonian Monte Carlo sampling methods defined...