We present the analysis of exponential mean-square stability properties of nonlinear stochastic linear multistep methods. In particular it is known that, under certain hypothesis on the drift and diffusion terms of the equation, exponential mean-square contractivity is visible: the qualitative feature of the exact problem is here analyzed under the numerical perspective, to understand whether a stochastic linear multistep method can provide an analogous behaviour and which restrictions on the employed stepsize should be imposed in order to reproduce the contractive behaviour. Numerical experiments confirming the theoretical analysis are also given
The (asymptotic) behaviour of the second moment of solutions to stochastic differential equations is...
The fundamental analysis of numerical methods for stochastic differential equations (SDEs) has been ...
Several results concerning asymptotical mean square stability of an equilibrium point (here the null...
We present the analysis of exponential mean-square stability properties of nonlinear stochastic lin...
AbstractThe aim of this paper is the analysis of exponential mean-square stability properties of non...
Positive results are proved here about the ability of numerical simulations to reproduce the exponen...
Positive results are proved here about the ability of numerical simulations to reproduce the exponen...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
AbstractThis paper is concerned with exponential mean square stability of the classical stochastic t...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
Stability analysis of numerical methods for ordinary differential equations (ODEs) is motivated by t...
Relatively little is known about the ability of numerical methods for stochastic differential equati...
This paper is mainly concerned with whether the almost sure exponential stability of stochastic diff...
In this talk we aim to analyze conservation properties of numerical methods for stochastic differen...
The (asymptotic) behaviour of the second moment of solutions to stochastic differential equations is...
The fundamental analysis of numerical methods for stochastic differential equations (SDEs) has been ...
Several results concerning asymptotical mean square stability of an equilibrium point (here the null...
We present the analysis of exponential mean-square stability properties of nonlinear stochastic lin...
AbstractThe aim of this paper is the analysis of exponential mean-square stability properties of non...
Positive results are proved here about the ability of numerical simulations to reproduce the exponen...
Positive results are proved here about the ability of numerical simulations to reproduce the exponen...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
AbstractThis paper is concerned with exponential mean square stability of the classical stochastic t...
The aim of this talk is the analysis of various stability issues for numerical methods designed to s...
Stability analysis of numerical methods for ordinary differential equations (ODEs) is motivated by t...
Relatively little is known about the ability of numerical methods for stochastic differential equati...
This paper is mainly concerned with whether the almost sure exponential stability of stochastic diff...
In this talk we aim to analyze conservation properties of numerical methods for stochastic differen...
The (asymptotic) behaviour of the second moment of solutions to stochastic differential equations is...
The fundamental analysis of numerical methods for stochastic differential equations (SDEs) has been ...
Several results concerning asymptotical mean square stability of an equilibrium point (here the null...
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