We study the problem of simulating the slow observable of a multiscale diffusion process. In particular, we extend previous algorithms to the case where the simulation of the different scales cannot be uncoupled and we have no explicit knowledge of the drift or the variance of the multiscale diffusion. This is the case when the simulation data come from a black box "legacy code," or possibly from a. ne scale simulator (e.g., MD, kMC) which we want to effectively model as a diffusion process. We improve the algorithm, using the past simulations as control variates, in order to reduce the variance of the subsequent simulations
Detailed microscale simulation is typically too computationally expensive for the long time simulati...
In this thesis, I examine several situations in which one can improve the efficiency of a stochastic...
Eliminate the fast degrees of freedom in multiscale systems and derive an effective (stochastic) mod...
We study a variance reduction strategy based on control variables for simulating the averaged macros...
We propose a novel variance reduction strategy based on control variables for simulating the average...
AbstractWe propose a novel variance reduction strategy based on control variables for simulating the...
The development of efficient numerical methods for kinetic equations with stochastic parameters is a...
We propose numerical algorithms for solving complex, high- dimensional control and importance sampli...
Variance reduction techniques are designed to improve the efficiency of stochastic simulations--that...
Stochastic simulation of coupled chemical reactions is often computationally intensive, especially i...
We deal with parameter estimation in the context of so-called multiscale diffusions. For this type o...
We give a variance reduction method evaluating for numerical SDEs. The reduction of variance is expl...
Stochastic simulation of coupled chemical reactions is often computationally intensive, especially i...
We look at numerical methods for simulation of stochastic differential equations exhibiting volatili...
This paper deals with parameter estimation in the context of so-called multiscale diffusions. The ai...
Detailed microscale simulation is typically too computationally expensive for the long time simulati...
In this thesis, I examine several situations in which one can improve the efficiency of a stochastic...
Eliminate the fast degrees of freedom in multiscale systems and derive an effective (stochastic) mod...
We study a variance reduction strategy based on control variables for simulating the averaged macros...
We propose a novel variance reduction strategy based on control variables for simulating the average...
AbstractWe propose a novel variance reduction strategy based on control variables for simulating the...
The development of efficient numerical methods for kinetic equations with stochastic parameters is a...
We propose numerical algorithms for solving complex, high- dimensional control and importance sampli...
Variance reduction techniques are designed to improve the efficiency of stochastic simulations--that...
Stochastic simulation of coupled chemical reactions is often computationally intensive, especially i...
We deal with parameter estimation in the context of so-called multiscale diffusions. For this type o...
We give a variance reduction method evaluating for numerical SDEs. The reduction of variance is expl...
Stochastic simulation of coupled chemical reactions is often computationally intensive, especially i...
We look at numerical methods for simulation of stochastic differential equations exhibiting volatili...
This paper deals with parameter estimation in the context of so-called multiscale diffusions. The ai...
Detailed microscale simulation is typically too computationally expensive for the long time simulati...
In this thesis, I examine several situations in which one can improve the efficiency of a stochastic...
Eliminate the fast degrees of freedom in multiscale systems and derive an effective (stochastic) mod...