Delay-dependent BIBO stability analysis of switched uncertain neutral systems. (English) Zbl 1219.93113
Summary: This paper presents the analysis of delay-dependent bounded input bounded output (BIBO) stability for a class of switched uncertain neutral systems. The uncertainty is assumed to be of structured linear fractional form which includes the norm-bounded uncertainty as a special case. First, by introducing the general variation-of-constants formula of neutral systems with perturbation, the BIBO stability property of general linear switched neutral systems with perturbation is established. Next, combining the general variation-of-constants formula with the state-dependent switching rule, new approaches are presented to design the feedback controller and the switching rules. Furthermore, the BIBO stability criteria are obtained in terms of the so-called Lyapunov-Metzler linear matrix inequalities (LMIs). Finally, simulation examples are given to demonstrate the effectiveness and the potential of the proposed techniques.
MSC:
| 93D25 | Input-output approaches in control theory |
| 93D15 | Stabilization of systems by feedback |
| 34K20 | Stability theory of functional-differential equations |
| 92E20 | Classical flows, reactions, etc. in chemistry |
| 93C30 | Control/observation systems governed by functional relations other than differential equations (such as hybrid and switching systems) |
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