Journal
IEEE TRANSACTIONS ON SYSTEMS MAN AND CYBERNETICS PART B-CYBERNETICS
Volume 39, Issue 5, Pages 1308-1315Publisher
IEEE-INST ELECTRICAL ELECTRONICS ENGINEERS INC
DOI: 10.1109/TSMCB.2008.2012350
Keywords
Dynamic output feedback (DOF) control; Ito stochastic systems; L-2-L-infinity performance; T-S fuzzy systems
Categories
Funding
- National Natural Science Foundation of China [60804002]
- Australian Research Council
- University of Western Sydney, Sydney, Australia
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This paper addresses the L-2-L-infinity dynamic output feedback (DOF) control problem for a class of nonlinear fuzzy It stochastic systems with time-varying delay. The focus is placed upon the design of a fuzzy DOF controller guaranteeing a prescribed noise attenuation level in an L-2-L-infinity sense. By using the slack matrix approach, a delay-dependent sufficient condition is derived to assure the mean-square asymptotic stability with an L-2-L-infinity performance for the closed-loop system. The corresponding solvability condition for a desired L-2-L-infinity DOF controller is established. Since these obtained conditions are not all expressed in terms of linear matrix inequality (LMI), the cone complementary linearization method is exploited to cast them into sequential minimization problems subject to LMI constraints, which can be easily solved numerically. Finally, numerical results are presented to demonstrate the usefulness of the proposed theory.
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