Stability and Stabilization of Markovian Jump Systems With Time Delay Via New Lyapunov Functionals

Author

Huang, He ; Feng, Gang ; Chen, Xiaoping

Author_Institution

Sch. of Electron. & Inf. Eng., Soochow Univ., Suzhou, China

Volume

59

Issue

10

fYear

2012

Firstpage

2413

Lastpage

2421

Abstract

This paper is concerned with the mean square exponential stability and stabilization problems of Markovian jump systems with time delay. New Lyapunov functionals are proposed by choosing distinct Lyapunov matrices for different system modes and introducing a triple-integral term. Some delay-dependent conditions, including some existing results as their special cases, are derived under which the resulting closed-loop system is mean square exponentially stable with a decay rate. The design of the feedback gain matrices is accomplished by solving linear matrix inequalities. Finally, the effectiveness and performance of the obtained results are demonstrated by numerical examples.

Keywords

Lyapunov matrix equations; Markov processes; asymptotic stability; closed loop systems; delays; linear matrix inequalities; Lyapunov functionals; Markovian jump systems; closed-loop system; decay rate; delay-dependent conditions; distinct Lyapunov matrices; feedback gain matrices; linear matrix inequalities; mean square exponential stability; stabilization problems; time delay; triple-integral term; Circuit stability; Delay effects; Educational institutions; Linear matrix inequalities; Numerical stability; Stability criteria; Linear matrix inequalities; Markovian jump systems; mean square exponential stabilization; new Lyapunov functionals; time delay;

fLanguage

English

Journal_Title

Circuits and Systems I: Regular Papers, IEEE Transactions on

Publisher

ieee

ISSN

1549-8328

Type

jour

DOI

10.1109/TCSI.2012.2189049

Filename

6213160