We deal with linear multi-step methods for SDEs and study when the numerical appro\-xi\-mation shares asymptotic properties in the mean-square sense of the exact solution. As in deterministic numerical analysis we use a linear time-invariant test equation and perform a linear stability analysis. Standard approaches used either to analyse deterministic multi-step methods or stochastic one-step methods do not carry over to stochastic multi-step schemes. In order to obtain sufficient conditions for asymptotic mean-square stability of stochastic linear two-step-Maruyama methods we construct and apply Lyapunov-type functionals. In particular we study the asymptotic mean-square stability of stochastic counterparts of two-step Adams-Bashforth- and...
AbstractThis paper is concerned with exponential mean square stability of the classical stochastic t...
Relatively little is known about the ability of numerical methods for stochastic differential equati...
As few stochastic differential equations have explicit solutions, the numerical schemes are studied ...
We deal with linear multi-step methods for SDEs and study when the numerical appro\-xi\-mation share...
Stability analysis of numerical methods for ordinary differential equations (ODEs) is motivated by t...
We consider linear multi-step methods for stochastic ordinary differential equations and study their...
AbstractThe aim of this paper is the analysis of exponential mean-square stability properties of non...
We study mean-square consistency, stability in the mean-square sense and mean-square convergence of ...
In this paper the numerical approximation of solutions of Ito stochastic differential equations is c...
As an extent of asymptotically absolute stability of numerical methods in deterministic situation, i...
AbstractWe consider linear multi-step methods for stochastic ordinary differential equations and stu...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
In this paper the numerical approximation of solutions of It{\^o} stochastic delay differential equa...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
AbstractGlobal almost sure asymptotic stability of stochastic θ-methods with nonrandom variable step...
AbstractThis paper is concerned with exponential mean square stability of the classical stochastic t...
Relatively little is known about the ability of numerical methods for stochastic differential equati...
As few stochastic differential equations have explicit solutions, the numerical schemes are studied ...
We deal with linear multi-step methods for SDEs and study when the numerical appro\-xi\-mation share...
Stability analysis of numerical methods for ordinary differential equations (ODEs) is motivated by t...
We consider linear multi-step methods for stochastic ordinary differential equations and study their...
AbstractThe aim of this paper is the analysis of exponential mean-square stability properties of non...
We study mean-square consistency, stability in the mean-square sense and mean-square convergence of ...
In this paper the numerical approximation of solutions of Ito stochastic differential equations is c...
As an extent of asymptotically absolute stability of numerical methods in deterministic situation, i...
AbstractWe consider linear multi-step methods for stochastic ordinary differential equations and stu...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
In this paper the numerical approximation of solutions of It{\^o} stochastic delay differential equa...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
AbstractGlobal almost sure asymptotic stability of stochastic θ-methods with nonrandom variable step...
AbstractThis paper is concerned with exponential mean square stability of the classical stochastic t...
Relatively little is known about the ability of numerical methods for stochastic differential equati...
As few stochastic differential equations have explicit solutions, the numerical schemes are studied ...