We generalize the result of T. Komorowski and G. Papanicolaou. We consider the solution of stochastic differential equation $dX(t)=V(t,X(t))dt+\sqrt{2\kappa}dB(t)$ where $B(t)$ is a standard $d$-dimensional Brownian motion and $V(t,x)$, $(t,x)\in R \times R^{d}$ is a $d$-dimensional, incompressible, stationary, random Gaussian field decorrelating in finite time. We prove that the weak limit as $\ep\downarrow 0$ of the family of rescaled processes $X_{\epsilon}(t)=\epsilon X(\frac{t}{\epsilon^{2}})$ exists and may be identified as a certain Brownian motion
Cataloged from PDF version of article.We study a class of systems of stochastic differential equatio...
We consider the motion of a particle under a continuum random environment whose distribution is give...
We provide general conditions under which a class of discrete-time volatility models driven by the s...
We generalize the result of T. Komorowski and G. Papanicolaou published in [7]. We consider the solu...
We consider a stochastic flow driven by a finite-dimensional Brownian motion. We show that almost ev...
AbstractIn this paper we deal with the solutions of Itô stochastic differential equationdXε(t)=1εVtε...
AbstractWe establish that the image of a measure, which satisfies a certain energy condition, moving...
AbstractA quantitative version of a well-known limit theorem for stochastic flows is establishing; o...
"Stochastic Analysis on Large Scale Interacting Systems". October 26~29, 2015. edited by Ryoki Fukus...
AbstractThe central limit (or fluctuation) phenomena are discussed in the interacting diffusion syst...
AbstractWe study transport properties of isotropic Brownian flows. Under a transience condition for ...
Limit theorems of the type of the law of large numbers and the central limit theorem are established...
AbstractSuppose that L=∑i,j=1daij(x)∂2/∂xi∂xj is uniformly elliptic. We use XL(t) to denote the diff...
In this paper we present a rigorous asymptotic analysis for stochastic systems with two fast relaxat...
1 figure; revised versionIn this paper, we study Gaussian multiplicative chaos in the critical case....
Cataloged from PDF version of article.We study a class of systems of stochastic differential equatio...
We consider the motion of a particle under a continuum random environment whose distribution is give...
We provide general conditions under which a class of discrete-time volatility models driven by the s...
We generalize the result of T. Komorowski and G. Papanicolaou published in [7]. We consider the solu...
We consider a stochastic flow driven by a finite-dimensional Brownian motion. We show that almost ev...
AbstractIn this paper we deal with the solutions of Itô stochastic differential equationdXε(t)=1εVtε...
AbstractWe establish that the image of a measure, which satisfies a certain energy condition, moving...
AbstractA quantitative version of a well-known limit theorem for stochastic flows is establishing; o...
"Stochastic Analysis on Large Scale Interacting Systems". October 26~29, 2015. edited by Ryoki Fukus...
AbstractThe central limit (or fluctuation) phenomena are discussed in the interacting diffusion syst...
AbstractWe study transport properties of isotropic Brownian flows. Under a transience condition for ...
Limit theorems of the type of the law of large numbers and the central limit theorem are established...
AbstractSuppose that L=∑i,j=1daij(x)∂2/∂xi∂xj is uniformly elliptic. We use XL(t) to denote the diff...
In this paper we present a rigorous asymptotic analysis for stochastic systems with two fast relaxat...
1 figure; revised versionIn this paper, we study Gaussian multiplicative chaos in the critical case....
Cataloged from PDF version of article.We study a class of systems of stochastic differential equatio...
We consider the motion of a particle under a continuum random environment whose distribution is give...
We provide general conditions under which a class of discrete-time volatility models driven by the s...