We propose a new approach to constructing weak numerical methods for finding solutions to stochastic systems with small noise. For these methods we prove an error estimate in terms of products hiεj (h is a time increment, ε is a small parameter). We derive various efficient weak schemes for systems with small noise and study the Talay-Tubaro expansion of their global error. An efficient approach to reducing the Monte-Carlo error is presented. Some of the proposed methods are tested by calculating the Lyapunov exponent of a linear system with small noise
We study a class of fully-discrete schemes for the numerical approximation of solutions of stochasti...
We consider linear multi-step methods for stochastic ordinary differential equations and study their...
A strategy for controlling the stepsize in the numerical integration of stochastic differential equa...
New approach to construction of weak numerical methods, which are intended for Monte-Carlo technique...
Abstract. We propose a new approach to constructing weak numerical methods for nding solutions to st...
A new approach to the construction of mean-square numerical methods for the solution of stochastic d...
New approach to construction of mean-square numerical methods for solution of stochastic differentia...
Abstract. A new approach to the construction of mean-square numerical methods for the solution of st...
Inspired by recent advances in the theory of modified differential equations, we propose a new metho...
This work proposes a novel weak Simpson method for numerical solution for a class of stochastic diff...
In this paper the numerical approximation of solutions of Ito stochastic differential equations is c...
In this thesis, the convergence analysis of a class of weak approximations of solutions of stochast...
Inspired by recent advances in the theory of modified differential equations, we propose a new metho...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
The paper considers numerical stability and convergence of weak schemes solving stochastic different...
We study a class of fully-discrete schemes for the numerical approximation of solutions of stochasti...
We consider linear multi-step methods for stochastic ordinary differential equations and study their...
A strategy for controlling the stepsize in the numerical integration of stochastic differential equa...
New approach to construction of weak numerical methods, which are intended for Monte-Carlo technique...
Abstract. We propose a new approach to constructing weak numerical methods for nding solutions to st...
A new approach to the construction of mean-square numerical methods for the solution of stochastic d...
New approach to construction of mean-square numerical methods for solution of stochastic differentia...
Abstract. A new approach to the construction of mean-square numerical methods for the solution of st...
Inspired by recent advances in the theory of modified differential equations, we propose a new metho...
This work proposes a novel weak Simpson method for numerical solution for a class of stochastic diff...
In this paper the numerical approximation of solutions of Ito stochastic differential equations is c...
In this thesis, the convergence analysis of a class of weak approximations of solutions of stochast...
Inspired by recent advances in the theory of modified differential equations, we propose a new metho...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
The paper considers numerical stability and convergence of weak schemes solving stochastic different...
We study a class of fully-discrete schemes for the numerical approximation of solutions of stochasti...
We consider linear multi-step methods for stochastic ordinary differential equations and study their...
A strategy for controlling the stepsize in the numerical integration of stochastic differential equa...