AbstractSuppose that L=∑i,j=1daij(x)∂2/∂xi∂xj is uniformly elliptic. We use XL(t) to denote the diffusion associated with L. In this paper we show that, if the dimension of the set {x:[aij(x)]≠12I} is strictly less than d, the random variable (XL(T)−XL(0))/T converges in distribution to a standard Gaussian random variable. In fact, we also provide rates of convergence. As an application, these results are used to study a problem of a random walk in a random environment
AbstractWe consider uniformly elliptic diffusion processes X(t,x) on Euclidean spaces Rd, with some ...
AbstractWe consider sequences of random variables of the type Sn=n−1/2∑k=1n{f(Xk)−E[f(Xk)]}, n≥1, wh...
We study the weak convergence of solutions of the Itˆo stochastic equation, whose coeffcients depen...
AbstractSuppose that L=∑i,j=1daij(x)∂2/∂xi∂xj is uniformly elliptic. We use XL(t) to denote the diff...
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
AbstractA quantitative version of a well-known limit theorem for stochastic flows is establishing; o...
We generalize the result of T. Komorowski and G. Papanicolaou. We consider the solution of stochasti...
AbstractWe approximate the empirical process, based on multivariate random samples with an arbitrary...
AbstractWe study different examples of singular perturbations of one-dimensional stochastic differen...
We provide general conditions under which a class of discrete-time volatility models driven by the s...
AbstractWe prove a full large deviations principle in large time, for a diffusion process with rando...
We study a one-dimensional diffusion process in a drifted Brownian potential. We characterize the up...
We determine the rate of decay of the expectation Z(t) of some multiplicative functional related to ...
International audienceRandom walks in random scenery are processes defined by $Z_n:=\sum_{k=1}^n\xi_...
AbstractLet W=(Wi)i∈N be an infinite dimensional Brownian motion and (Xt)t≥0 a continuous adaptedn-d...
AbstractWe consider uniformly elliptic diffusion processes X(t,x) on Euclidean spaces Rd, with some ...
AbstractWe consider sequences of random variables of the type Sn=n−1/2∑k=1n{f(Xk)−E[f(Xk)]}, n≥1, wh...
We study the weak convergence of solutions of the Itˆo stochastic equation, whose coeffcients depen...
AbstractSuppose that L=∑i,j=1daij(x)∂2/∂xi∂xj is uniformly elliptic. We use XL(t) to denote the diff...
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
AbstractA quantitative version of a well-known limit theorem for stochastic flows is establishing; o...
We generalize the result of T. Komorowski and G. Papanicolaou. We consider the solution of stochasti...
AbstractWe approximate the empirical process, based on multivariate random samples with an arbitrary...
AbstractWe study different examples of singular perturbations of one-dimensional stochastic differen...
We provide general conditions under which a class of discrete-time volatility models driven by the s...
AbstractWe prove a full large deviations principle in large time, for a diffusion process with rando...
We study a one-dimensional diffusion process in a drifted Brownian potential. We characterize the up...
We determine the rate of decay of the expectation Z(t) of some multiplicative functional related to ...
International audienceRandom walks in random scenery are processes defined by $Z_n:=\sum_{k=1}^n\xi_...
AbstractLet W=(Wi)i∈N be an infinite dimensional Brownian motion and (Xt)t≥0 a continuous adaptedn-d...
AbstractWe consider uniformly elliptic diffusion processes X(t,x) on Euclidean spaces Rd, with some ...
AbstractWe consider sequences of random variables of the type Sn=n−1/2∑k=1n{f(Xk)−E[f(Xk)]}, n≥1, wh...
We study the weak convergence of solutions of the Itˆo stochastic equation, whose coeffcients depen...