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CDC
2015
IEEE
2015
IEEE
Converse control-Lyapunov function theorems for continuous-time switched linear systems
Abstract— This paper studies switching stabilization problems for continuous-time switched linear systems (SLSs). We consider the most general switching stabilizability defined as the existence of a measurable switching signal under which the resulting time-varying system is asymptotically stable. In addition, we consider feedback stabilizability in Filippov sense defined as the existence of a switching law under which the closed-loop Filippov solution is asymptotically stable. We develop sufficient and necessary conditions for switching stabilizability as well as feedback stabilizability in Filippov sense. It is proved that for continuous-time SLSs, both switching stabilizability and feedback stabilizability in Filippov sense are equivalent to the existence of a piecewise quadratic control-Lyapunov function (CLF). Furthermore, such a CLF can be obtained by taking the pointwise minimum of a finite number of quadratic functions.
Real-time Traffic| Added | 17 Apr 2016 |
| Updated | 17 Apr 2016 |
| Type | Journal |
| Year | 2015 |
| Where | CDC |
| Authors | Yueyun Lu, Wei Zhang |
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