International audienceIn this article, we consider a stochastic PDE of parabolic type, driven by a space-time white-noise, and its numerical discretization in time with a semi-implicit Euler scheme. When the nonlinearity is assumed to be bounded, then a dissipativity assumption is satisfied, which ensures that the SDPE admits a unique invariant probability measure, which is ergodic and strongly mixing - with exponential convergence to equilibrium. Considering test functions of class $\mathcal{C}^2$, bounded and with bounded derivatives, we prove that we can approximate this invariant measure using the numerical scheme, with order $1/2$ with respect to the time step
We consider the long-time behavior of an explicit tamed exponential Euler scheme applied to a class ...
International audienceIn this paper we study the approximation of the distribution of $X_t$ Hilbert-...
The stochastic trapezoidal rule provides the only discretization scheme from the family of implicit ...
International audienceWe study the long-time behavior of fully discretized semilinear SPDEs with add...
International audienceWe introduce a time-integrator to sample with high order of accuracy the invar...
We propose a modification of the standard linear implicit Euler integrator for the weak approximatio...
The topic of the talk were the time approximation of quasi linear stochastic partial differential eq...
This article investigates the weak approximation towards the invariant measure of semi-linear stocha...
The content is based on the lectures delivered at CERMICS in March 2014The main two aims of these le...
Math of Comp, to appear (2009)International audienceWe study the error of the Euler scheme applied t...
This devoted to the theoretical and numerical analysis of a certain class of stochastic partial diff...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We consider the long-time behavior of an explicit tamed exponential Euler scheme applied to a class ...
International audienceIn this paper we study the approximation of the distribution of $X_t$ Hilbert-...
The stochastic trapezoidal rule provides the only discretization scheme from the family of implicit ...
International audienceWe study the long-time behavior of fully discretized semilinear SPDEs with add...
International audienceWe introduce a time-integrator to sample with high order of accuracy the invar...
We propose a modification of the standard linear implicit Euler integrator for the weak approximatio...
The topic of the talk were the time approximation of quasi linear stochastic partial differential eq...
This article investigates the weak approximation towards the invariant measure of semi-linear stocha...
The content is based on the lectures delivered at CERMICS in March 2014The main two aims of these le...
Math of Comp, to appear (2009)International audienceWe study the error of the Euler scheme applied t...
This devoted to the theoretical and numerical analysis of a certain class of stochastic partial diff...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We consider the long-time behavior of an explicit tamed exponential Euler scheme applied to a class ...
International audienceIn this paper we study the approximation of the distribution of $X_t$ Hilbert-...
The stochastic trapezoidal rule provides the only discretization scheme from the family of implicit ...