In this article, finite-time mathcal H_infty control is studied for a kind of continuous-time-switched Takagi-Sugeno (T-S) fuzzy systems with mode-dependent average dwell-time (MDADT) switching. The dynamic event-triggered mechanism (ETM) is utilized to monitor the data transmission from the system plant to the controller, which more efficiently reduces the amount of transmitted data than the conventional static one. First, it is demonstrated that the adopted dynamic ETM can avoid the Zeno behavior, and also yield a larger minimal interexecution time compared with the static one. Then, an improved criterion of finite-time mathcal H_infty performance is introduced by utilizing a novel Lyapunov-like function with an internal dynamic variable. Based on this criterion, a dynamic event-triggered controller is designed together with a switching signal subject to the MDADT property. Finally, the validity, and virtues of the proposed control scheme are verified by two simulation examples.
Bibliographical notePublisher Copyright:
© 1993-2012 IEEE.
- Dynamic event-triggered control
- finite-time boundedness
- finite-time H_infty performance
- switched Takagi-Sugeno (T-S) fuzzy system
ASJC Scopus subject areas
- Control and Systems Engineering
- Computational Theory and Mathematics
- Artificial Intelligence
- Applied Mathematics