Extending LaSalle´s invariance principle to impulsive switched systems with an application to hybrid epidemic dynamics

Author

Liu, Jun ; Liu, Xinzhi ; Xie, Wei-Chau

Author_Institution

Dept. of Appl. Math., Univ. of Waterloo, Waterloo, ON, Canada

fYear

2010

fDate

26-28 May 2010

Firstpage

136

Lastpage

141

Abstract

By introducing the notions of persistent limit set and persistent mode, we extend the classical LaSalle´s invariance principle to hybrid systems exhibiting both impulses and switchings. A weak invariance principle is established for such systems, under a weak dwell-time condition on the impulsive and switching signals. This weak invariance principle is then applied to derive two asymptotic stability criteria for impulsive switched systems. As an application of the stability criteria,we investigate a switched SEIR epidemic model with pulse treatment and establish sufficient conditions for the global asymptotic stability of the disease-free solution under weak dwell-time signals.

Keywords

asymptotic stability; invariance; time-varying systems; LaSalle´s invariance principle; asymptotic stability criteria; disease-free solution; global asymptotic stability; hybrid epidemic dynamics; impulsive switched system; persistent limit set; persistent mode; pulse treatment; switched SEIR epidemic model; weak invariance principle; Asymptotic stability; Councils; Differential equations; Linear systems; Lyapunov method; Mathematics; Nonlinear systems; Stability criteria; Sufficient conditions; Switched systems; Hybrid SEIR model; Hybrid system; Impulsive system; Invariance principle; Multiple Lyapunov functions; Stability; Switched system; Weak dwell-time;

fLanguage

English

Publisher

ieee

Conference_Titel

Control and Decision Conference (CCDC), 2010 Chinese

Conference_Location

Xuzhou

Print_ISBN

978-1-4244-5181-4

Electronic_ISBN

978-1-4244-5182-1

Type

conf

DOI

10.1109/CCDC.2010.5499107

Filename

5499107