Information Sciences: an International Journal
Brief paper: Stability analysis for discrete-time switched time-delay systems
Automatica (Journal of IFAC)
IEEE Transactions on Systems, Man, and Cybernetics, Part B: Cybernetics - Special issue on human computing
Robust fault detection for switched linear systems with state delays
IEEE Transactions on Systems, Man, and Cybernetics, Part B: Cybernetics
Robust tracking control of a class of nonlinear switched systems: an average dwell-time method
ACC'09 Proceedings of the 2009 conference on American Control Conference
Robust stabilization and L2-gain analysis for uncertain switched systems with time-varying delay
CCDC'09 Proceedings of the 21st annual international conference on Chinese Control and Decision Conference
Average dwell time approach robust stabilization of switched linear systems with time-delay
CCDC'09 Proceedings of the 21st annual international conference on Chinese control and decision conference
Multistability of genetic regulatory networks
International Journal of Systems Science - Dynamics Analysis of Gene Regulatory Networks
New results on delay-dependent robust stability of uncertain time delay systems
International Journal of Systems Science
Delay dependent stability results for fuzzy BAM neural networks with Markovian jumping parameters
Expert Systems with Applications: An International Journal
Computers & Mathematics with Applications
Stabilization for switched stochastic neutral systems under asynchronous switching
Information Sciences: an International Journal
Dynamic output feedback control for a class of switched delay systems under asynchronous switching
Information Sciences: an International Journal
Hi-index | 0.00 |
This correspondence considers the stability problem for a class of linear switched systems with time-varying delay in the sense of Hurwitz convex combination. The bound of derivative of the time-varying delay can be an unknown constant. It is concluded that the stability result for linear switched systems still holds for such systems with time-varying delay under a certain delay bound. Moreover, the delay bound of guaranteeing system stability can be easily obtained based on linear matrix inequalities (LMIs). As a special case, when the time-varying delay becomes constant, the criterion obtained in this correspondence is less conservative than existing ones. The reason for less conservativeness is also explicitly explained in this correspondence. Simulation examples illustrate the effectiveness of the proposed method.