37 pagesIn this paper, we consider the averaging principle for one dimensional stochastic Burgers equation with slow and fast time-scales. Under some suitable conditions, we show that the slow component strongly converges to the solution of the corresponding averaged equation. Meanwhile, when there is no noise in the slow component equation, we also prove that the slow component weakly converges to the solution of the corresponding averaged equation with the order of convergence $1-r$, for any $0<r<1$
An averaging result is proved for stochastic evolution equations with highly oscillating coefficient...
We study the validity of an averaging principle for a slow-fast system of stochastic reaction-diffus...
Röckner M, Xie L, Yang L. Averaging principle and normal deviations for multi-scale stochastic hyper...
37 pagesIn this paper, we consider the averaging principle for one dimensional stochastic Burgers eq...
Liu W, Röckner M, Sun X, Xie Y. Averaging principle for slow-fast stochastic differential equations ...
We consider a one-dimensional stochastic differential equation driven by a Wiener process, where the...
International audienceThis article is devoted to the analysis of semilinear, parabolic, Stochastic P...
Abstract In this paper, we deal with the averaging principle for a two-time-scale system of jump-dif...
Liu W, Röckner M, Sun X, Xie Y. Strong Averaging Principle for Slow-Fast Stochastic Partial Differen...
In this paper, we aim to develop the averaging principle for a slow-fast system of stochastic reacti...
Cheng M, Liu Z, Röckner M. Averaging principle for stochastic complex Ginzburg-Landau equations. Jou...
AbstractThe theory of stochastic averaging principle provides an effective approach for the qualitat...
Averaging is an important method to extract effective macroscopic dynamics from complex systems with...
We consider stochastic dynamical systems with multiple time scales. An intermediate reduced model is...
In this work we are concerned with the study of the strong order of convergence in the averaging pri...
An averaging result is proved for stochastic evolution equations with highly oscillating coefficient...
We study the validity of an averaging principle for a slow-fast system of stochastic reaction-diffus...
Röckner M, Xie L, Yang L. Averaging principle and normal deviations for multi-scale stochastic hyper...
37 pagesIn this paper, we consider the averaging principle for one dimensional stochastic Burgers eq...
Liu W, Röckner M, Sun X, Xie Y. Averaging principle for slow-fast stochastic differential equations ...
We consider a one-dimensional stochastic differential equation driven by a Wiener process, where the...
International audienceThis article is devoted to the analysis of semilinear, parabolic, Stochastic P...
Abstract In this paper, we deal with the averaging principle for a two-time-scale system of jump-dif...
Liu W, Röckner M, Sun X, Xie Y. Strong Averaging Principle for Slow-Fast Stochastic Partial Differen...
In this paper, we aim to develop the averaging principle for a slow-fast system of stochastic reacti...
Cheng M, Liu Z, Röckner M. Averaging principle for stochastic complex Ginzburg-Landau equations. Jou...
AbstractThe theory of stochastic averaging principle provides an effective approach for the qualitat...
Averaging is an important method to extract effective macroscopic dynamics from complex systems with...
We consider stochastic dynamical systems with multiple time scales. An intermediate reduced model is...
In this work we are concerned with the study of the strong order of convergence in the averaging pri...
An averaging result is proved for stochastic evolution equations with highly oscillating coefficient...
We study the validity of an averaging principle for a slow-fast system of stochastic reaction-diffus...
Röckner M, Xie L, Yang L. Averaging principle and normal deviations for multi-scale stochastic hyper...