In this paper, we investigate the stability problem for some Markovian switching reaction-diffusion coupled systems on networks (MSRDCSNs). By using the Lyapunov function, we establish some novel stability principles for stochastic stability, asymptotically stochastic stability, globally asymptotically stochastic stability and almost surely exponential stability of the MSRDCSNs. These stability principles have a close relation to the topology property of the network. We also provide a systematic method for constructing global Lyapunov function for these MSRDCSNs by using graph theory. The new method can help analyze the dynamics of complex networks. © 2014
Abstract—This note is concerned with stability analysis and stabilization of randomly switched syste...
Piecewise-linear in rates (PWLR) Lyapunov functions are introduced for a class of chemical reaction ...
Although Chemical Reaction Networks (CRNs) form a rich class of nonlinear systems that can exhibit w...
In this paper, we investigate the stability problem for some Markovian switching reaction-diffusion ...
This paper is devoted to investigating stability in mean of partial variables for coupled stochastic...
In this paper, asymptotic stability of dynamical networks with non-identical nodes is investigated. ...
AbstractThe global-stability problem of equilibria is investigated for coupled systems of differenti...
In this paper, asymptotic stability of dynamical networks with non-identical nodes is investigated. ...
So far, the Lyapunov direct method is still the most effective technique in the study of stability f...
Global asymptotic stability of general dynamical networks with non-identical nodes is studied by int...
Global asymptotic stability of general dynamical networks with non-identical nodes is studied by int...
A new system-theoretic approach for studying the stability and control of chemical reaction networks...
This paper contributes to extending the validity of Lyapunov function PDEs whose solution is conject...
In this paper, we present a master stability function (MSF) for the synchronization of identical map...
This paper is devoted to investigating mean square stability of a class of stochastic reaction-diffu...
Abstract—This note is concerned with stability analysis and stabilization of randomly switched syste...
Piecewise-linear in rates (PWLR) Lyapunov functions are introduced for a class of chemical reaction ...
Although Chemical Reaction Networks (CRNs) form a rich class of nonlinear systems that can exhibit w...
In this paper, we investigate the stability problem for some Markovian switching reaction-diffusion ...
This paper is devoted to investigating stability in mean of partial variables for coupled stochastic...
In this paper, asymptotic stability of dynamical networks with non-identical nodes is investigated. ...
AbstractThe global-stability problem of equilibria is investigated for coupled systems of differenti...
In this paper, asymptotic stability of dynamical networks with non-identical nodes is investigated. ...
So far, the Lyapunov direct method is still the most effective technique in the study of stability f...
Global asymptotic stability of general dynamical networks with non-identical nodes is studied by int...
Global asymptotic stability of general dynamical networks with non-identical nodes is studied by int...
A new system-theoretic approach for studying the stability and control of chemical reaction networks...
This paper contributes to extending the validity of Lyapunov function PDEs whose solution is conject...
In this paper, we present a master stability function (MSF) for the synchronization of identical map...
This paper is devoted to investigating mean square stability of a class of stochastic reaction-diffu...
Abstract—This note is concerned with stability analysis and stabilization of randomly switched syste...
Piecewise-linear in rates (PWLR) Lyapunov functions are introduced for a class of chemical reaction ...
Although Chemical Reaction Networks (CRNs) form a rich class of nonlinear systems that can exhibit w...