In this paper, we consider a controller failure time analysis problem for a class of symmetric linear time-invariant (LTI) systems controlled by a pre-designed symmetric static output feedback. We assume that the controller fails from time to time due to physical or purposeful reason, and analyze stability and ℋ∞ disturbance attenuation properties for the entire system. Our objective is to find conditions concerning controller failure time, under which the system's stability and ℋ∞ disturbance attenuation properties are preserved to a desired level. For both stability and ℋ∞ disturbance attenuation analysis, we show that if the unavailability rate of the controller is smaller than a specified constant, then global exponential stability of the entire system and a reasonable ℋ∞ disturbance attenuation level is achieved. The key point is to establish a common quadratic Lyapunov-like function for the case where the controller works and the case where the controller fails.
|Proceedings of the IEEE Conference on Decision and Control
|Published - 2003
|42nd IEEE Conference on Decision and Control - Maui, HI, United States
継続期間: 2003 12月 9 → 2003 12月 12
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