So far, the Lyapunov direct method is still the most effective technique in the study of stability for ordinary differential equations and stochastic differential equations. Due to the shortage of the corresponding Itô formula, this useful method has not been popularized in stochastic partial differential equations. The aim of this work is to try to extend the Lyapunov direct method to the Itô stochastic reaction diffusion systems and to establish the corresponding Lyapunov stability theory, including stability in probablity, asymptotic stability in probability, and exponential stability in mean square. As the application of the obtained theorems, this paper addresses the stability of the Hopfield neural network and points out that the main...
By using a technique of model transformation of the system, a new type of Lyapunov functional is int...
The concepts of stability in probability of nontrivial solutions for stochastic nonlinear systems ar...
This paper is concerned with the almost sure partial practical stability of stochastic differential ...
So far, the Lyapunov direct method is still the most effective technique in the study of stability f...
Published version of an article in the journal: Abstract and Applied Analysis. Also available from t...
This article presents a brief survey on the use of Lyapunov method for stochastic differential equat...
Stability in the Lyapunov sense for deterministic systems has been well studied since the beginning ...
In this thesis, pth moment and almost sure stability on a general decay rate for several types of st...
Stability of stochastic differential equations (SDEs) has become a very popular theme of recent rese...
In this paper, we investigate the stability problem for some Markovian switching reaction-diffusion ...
This paper studies the asymptotic behavior for a class of delayed reaction-diffusion Hopfield neural...
This paper is concerned with pth moment exponential stability of stochastic reaction-diffusion Cohen...
In this thesis we use viscosity methods to study some stability properties of the equilibria of cont...
In this paper, the exponential stability problem is considered for a class of hysteretic Hopfield ne...
The main aim of this paper is to discuss moment exponential stability for a stochastic reaction-diff...
By using a technique of model transformation of the system, a new type of Lyapunov functional is int...
The concepts of stability in probability of nontrivial solutions for stochastic nonlinear systems ar...
This paper is concerned with the almost sure partial practical stability of stochastic differential ...
So far, the Lyapunov direct method is still the most effective technique in the study of stability f...
Published version of an article in the journal: Abstract and Applied Analysis. Also available from t...
This article presents a brief survey on the use of Lyapunov method for stochastic differential equat...
Stability in the Lyapunov sense for deterministic systems has been well studied since the beginning ...
In this thesis, pth moment and almost sure stability on a general decay rate for several types of st...
Stability of stochastic differential equations (SDEs) has become a very popular theme of recent rese...
In this paper, we investigate the stability problem for some Markovian switching reaction-diffusion ...
This paper studies the asymptotic behavior for a class of delayed reaction-diffusion Hopfield neural...
This paper is concerned with pth moment exponential stability of stochastic reaction-diffusion Cohen...
In this thesis we use viscosity methods to study some stability properties of the equilibria of cont...
In this paper, the exponential stability problem is considered for a class of hysteretic Hopfield ne...
The main aim of this paper is to discuss moment exponential stability for a stochastic reaction-diff...
By using a technique of model transformation of the system, a new type of Lyapunov functional is int...
The concepts of stability in probability of nontrivial solutions for stochastic nonlinear systems ar...
This paper is concerned with the almost sure partial practical stability of stochastic differential ...