Dissipativity Based Stability of Switched Systems with State-dependent Switchings

Date

2007

Authors

Zhao, Jun
Hill, David

Journal Title

Journal ISSN

Volume Title

Publisher

Institute of Electrical and Electronics Engineers (IEEE Inc)

Abstract

Stability problem of switched systems with state-dependent switchings is addressed. Sufficient conditions for stability are presented using dissipativity property of subsystems on their active regions. In these conditions, each storage function of a subsystem is allowed to grow on the "switched on" time sequence but the total growth is bounded in certain ways. Asymptotic stability is achieved under further assumptions of a detectability property of a local form and boundedness of the total change of some storage function on its inactive intervals. A necessary and sufficient condition for all subsystems to be dissipative on their active regions is given and a state-dependent switching law is designed. As a particular case, localized Kalman-Yakubovich-Popov conditions are derived for passivity. A condition for piecewise dissipativity property and a design method of switching laws are also proposed.

Description

Keywords

Keywords: Asymptotic stability; Energy dissipation; Problem solving; Switching; System stability; Dissipativity property; Kalman-Yakubovich-Popov conditions; State-dependent switchings; Storage functions; Switching systems

Citation

Source

Proceedings of the 46th IEEE Conference on Decision and Control 2007

Type

Conference paper

Book Title

Entity type

Access Statement

License Rights

Restricted until

2037-12-31