We study a variance reduction strategy based on control variables for simulating the averaged macroscopic behavior of a stochastic slow-fast system. We assume that this averaged behavior can be written in terms of a few slow degrees of freedom, and that the fast dynamics is ergodic for every fixed value of the slow variable. The time derivative for the averaged dynamics can then be approximated by a Markov chain Monte Carlo method. The variance-reduced scheme that is introduced here uses the previous time instant as a control variable. We analyze the variance and bias of the proposed estimator and illustrate its performance when applied to a linear and nonlinear model problem.21 pages, 11 figuresstatus: publishe
An averaged system to approximate the slow dynamics of a two timescale nonlinear stochastic control ...
Variance reduction techniques are designed to improve the efficiency of stochastic simulations--that...
Abstract. We present and analyze a micro/macro acceleration technique for the Monte Carlo simulation...
We study a variance reduction strategy based on control variables for simulating the averaged macros...
AbstractWe propose a novel variance reduction strategy based on control variables for simulating the...
We propose a novel variance reduction strategy based on control variables for simulating the average...
We study the problem of simulating the slow observable of a multiscale diffusion process. In particu...
Eliminate the fast degrees of freedom in multiscale systems and derive an effective (stochastic) mod...
We consider stochastic dynamical systems with multiple time scales. An intermediate reduced model is...
The development of efficient numerical methods for kinetic equations with stochastic parameters is a...
We give a variance reduction method evaluating for numerical SDEs. The reduction of variance is expl...
Abstract. A stochastic mode reduction strategy is applied to multiscale models with a de-terministic...
Multiscale dynamics are frequently present in real-world processes, such as the atmosphere-ocean and...
We propose a stochastic model reduction strategy for deterministic and stochastic slow-fast systems ...
International audienceIn this work, we develop a reduced-basis approach for the efficient computatio...
An averaged system to approximate the slow dynamics of a two timescale nonlinear stochastic control ...
Variance reduction techniques are designed to improve the efficiency of stochastic simulations--that...
Abstract. We present and analyze a micro/macro acceleration technique for the Monte Carlo simulation...
We study a variance reduction strategy based on control variables for simulating the averaged macros...
AbstractWe propose a novel variance reduction strategy based on control variables for simulating the...
We propose a novel variance reduction strategy based on control variables for simulating the average...
We study the problem of simulating the slow observable of a multiscale diffusion process. In particu...
Eliminate the fast degrees of freedom in multiscale systems and derive an effective (stochastic) mod...
We consider stochastic dynamical systems with multiple time scales. An intermediate reduced model is...
The development of efficient numerical methods for kinetic equations with stochastic parameters is a...
We give a variance reduction method evaluating for numerical SDEs. The reduction of variance is expl...
Abstract. A stochastic mode reduction strategy is applied to multiscale models with a de-terministic...
Multiscale dynamics are frequently present in real-world processes, such as the atmosphere-ocean and...
We propose a stochastic model reduction strategy for deterministic and stochastic slow-fast systems ...
International audienceIn this work, we develop a reduced-basis approach for the efficient computatio...
An averaged system to approximate the slow dynamics of a two timescale nonlinear stochastic control ...
Variance reduction techniques are designed to improve the efficiency of stochastic simulations--that...
Abstract. We present and analyze a micro/macro acceleration technique for the Monte Carlo simulation...