The concept of effective order is a popular methodology in the deterministic literature for the construction of efficient and accurate integrators for differential equations over long times. The idea is to enhance the accuracy of a numerical method by using an appropriate change of variables called the processor. We show that this technique can be extended to the stochastic context for the construction of new high order integrators for the sampling of the invariant measure of ergodic systems. The approach is illustrated with modifications of the stochastic $ heta$-method applied to Brownian dynamics, where postprocessors achieving order two are introduced. Numerical experiments, including stiff ergodic systems, illustrate the efficiency and...
We discuss stochastic differential equations with a stiff linear part and their approximation by sto...
We introduce a new algebraic framework based on a modification (called exotic) of aromatic Butcher-s...
International audienceInspired by recent advances in the theory of modified differential equations, ...
International audienceThe concept of effective order is a popular methodology in the deterministic l...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
The numerical methods are described in: Adrien Laurent, Gilles Vilmart, Order conditions for samplin...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We derive a new methodology for the construction of high-order integrators for sampling the invarian...
Inspired by recent advances in the theory of modified differential equations, we propose a new metho...
The aim of the work presented in this thesis is the construction and the study of numerical integrat...
We show that applying any deterministic B-series method of order pdwith a random step size to single...
We introduce a time-integrator to sample with high order of accuracy the invariant distribution for ...
A new explicit stabilized scheme of weak order one for stiff and ergodic stochastic differential equ...
A new explicit stabilized scheme of weak order one for stiff and ergodic stochastic differential equ...
We discuss stochastic differential equations with a stiff linear part and their approximation by sto...
We introduce a new algebraic framework based on a modification (called exotic) of aromatic Butcher-s...
International audienceInspired by recent advances in the theory of modified differential equations, ...
International audienceThe concept of effective order is a popular methodology in the deterministic l...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
The numerical methods are described in: Adrien Laurent, Gilles Vilmart, Order conditions for samplin...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We derive a new methodology for the construction of high-order integrators for sampling the invarian...
Inspired by recent advances in the theory of modified differential equations, we propose a new metho...
The aim of the work presented in this thesis is the construction and the study of numerical integrat...
We show that applying any deterministic B-series method of order pdwith a random step size to single...
We introduce a time-integrator to sample with high order of accuracy the invariant distribution for ...
A new explicit stabilized scheme of weak order one for stiff and ergodic stochastic differential equ...
A new explicit stabilized scheme of weak order one for stiff and ergodic stochastic differential equ...
We discuss stochastic differential equations with a stiff linear part and their approximation by sto...
We introduce a new algebraic framework based on a modification (called exotic) of aromatic Butcher-s...
International audienceInspired by recent advances in the theory of modified differential equations, ...