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CDC
2009
IEEE
2009
IEEE
A Floquet-like factorization for linear periodic systems
In this note, the novel representation is proposed for a linear periodic continuous-time system with T-periodic real-valued coefficients. We prove that a T-periodic real-valued factor and two real-valued matrix exponential functions can be extracted from a state transition matrix, while, in the wellknown Floquet representation theorem, a 2T-periodic realvalued factor and a real-valued matrix exponential function are extracted from the state transition matrix. Then we also proved that any T-periodic system can be transformed to a system with T-periodic real-valued trigonometric coefficients using a T-periodic real-valued coordinate transformation, while, in the well-known Lyapunov reducibility theorem, a 2T-periodic realvalued coordinate transformation is utilized to transform the given periodic system into a time-invariant system with real coefficients. This new information can be useful for designing a T-periodic control law. NOTATIONS R the set of all real numbers C the set of all co...
Real-time TrafficCDC 2009 | Control Systems | Matrix Exponential | Matrix Exponential Function | State Transition Matrix |
Related Content
| Added | 12 Aug 2010 |
| Updated | 12 Aug 2010 |
| Type | Conference |
| Year | 2009 |
| Where | CDC |
| Authors | Ichiro Jikuya, Ichijo Hodaka |
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