AbstractOne concept of the stability of a solution of an evolutionary equation relates to the sensitivity of the solution to perturbations in the initial data; there are other stability concepts, notably those concerned with persistent perturbations. Results are presented on the stability in p-th mean of solutions of stochastic delay differential equations with multiplicative noise, and of stochastic delay difference equations. The difference equations are of a type found in numerical analysis and we employ our results to obtain mean-square stability criteria for the solution of the Euler–Maruyama discretization of stochastic delay differential equations.The analysis proceeds as follows: We show that an inequality of Halanay type (derivable...
A discrete stochastic Razumikhin-type theorem is established to investigate whether the Euler--Maruy...
Regard the stochastic differential delay equation dx(t) = [(A + Ā(t))x(t) + (B + B̄(t - τ))x(t - τ)]...
The problem of the mean square exponential stability for a class of discrete-time linear stochastic ...
This article is not available through ChesterRep.This article carries out an analysis which proceeds...
AbstractIn a very recent paper, Baker and Buckwar [Exponential stability in pth mean of solutions, a...
AbstractOur aim is to study under what conditions the exact and numerical solution (based on equidis...
We present a Razumilchin-type theorem for stochastic delay difference equation, and use it to invest...
Using an approach that has its origins in work of Halanay, we consider stability in mean square of n...
Abstract In this paper, we concern stability of numerical methods applied to stochastic delay integr...
This paper is concerned with the numerical solution of stochastic delay differential equations. The ...
AbstractIn this work, we investigate stochastic partial differential equations with variable delays ...
Many processes in automatic regulation, physics, mechanics, biology, economy, ecology etc. can be mo...
This paper focuses on a class of stochastic differential equations with mixed delay based on Lyapuno...
The aim of this paper is to investigate exponential stability of paths for a class of Hilbert space-...
Positive results are proved here about the ability of numerical simulations to reproduce the exponen...
A discrete stochastic Razumikhin-type theorem is established to investigate whether the Euler--Maruy...
Regard the stochastic differential delay equation dx(t) = [(A + Ā(t))x(t) + (B + B̄(t - τ))x(t - τ)]...
The problem of the mean square exponential stability for a class of discrete-time linear stochastic ...
This article is not available through ChesterRep.This article carries out an analysis which proceeds...
AbstractIn a very recent paper, Baker and Buckwar [Exponential stability in pth mean of solutions, a...
AbstractOur aim is to study under what conditions the exact and numerical solution (based on equidis...
We present a Razumilchin-type theorem for stochastic delay difference equation, and use it to invest...
Using an approach that has its origins in work of Halanay, we consider stability in mean square of n...
Abstract In this paper, we concern stability of numerical methods applied to stochastic delay integr...
This paper is concerned with the numerical solution of stochastic delay differential equations. The ...
AbstractIn this work, we investigate stochastic partial differential equations with variable delays ...
Many processes in automatic regulation, physics, mechanics, biology, economy, ecology etc. can be mo...
This paper focuses on a class of stochastic differential equations with mixed delay based on Lyapuno...
The aim of this paper is to investigate exponential stability of paths for a class of Hilbert space-...
Positive results are proved here about the ability of numerical simulations to reproduce the exponen...
A discrete stochastic Razumikhin-type theorem is established to investigate whether the Euler--Maruy...
Regard the stochastic differential delay equation dx(t) = [(A + Ā(t))x(t) + (B + B̄(t - τ))x(t - τ)]...
The problem of the mean square exponential stability for a class of discrete-time linear stochastic ...