Imperfect premise matching based fuzzy control with passive constraints for discrete time-delay multiplicative noised stochastic nonlinear systems

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• 作者：Cheung-Chieh Ku (1)
  Wen-Jer Chang (1)
  Chun-Hung Lin (1)
  Yao-Chung Chang (1)
  
• 关键词：Imperfect premise matching ; multiplicative noises ; passivity theory and discrete Jensen inequality ; Takagi ; Sugeno fuzzy models
• 刊名：International Journal of Control, Automation and Systems
• 出版年：2013
• 出版时间：June 2013
• 年：2013
• 卷：11
• 期：3
• 页码：614-623
• 全文大小：1720KB
• 参考文献：1. H. O. Wang, K. Tanaka, and M. F. Griffin, 鈥淎n approach to fuzzy control of nonlinear systems: stability and design issues,鈥? / IEEE Trans. Fuzzy Syst., vol. 4, no. 1, pp. 14鈥?3, February 1996. CrossRef
  2. M. Nachidi, A. Benzaouia, F. Tadeo, and M. A. Rami, 鈥淟MI-based approach for output-feedback stabilization for discrete-time Takagi-Sugeno systems,鈥? / IEEE Trans. Fuzzy Syst., vol. 16, no. 5, pp. 1188鈥?196, October 2008. CrossRef
  3. W. J. Chang and W. Chang, 鈥淒iscrete fuzzy control of time-delay affine Takagi-Sugeno fuzzy models with / H <sub>鈭?/sub> constraint,鈥? / IEE Proceeding, Part D, Control Theory and Applications, vol. 153, no. 6, pp. 745鈥?52, November 2006. CrossRef
  4. J. Dong and G. H. Yang, 鈥?em class="a-plus-plus">H 鈭?/sub> Controller synthesis via switched PDC scheme for discrete-time T-S fuzzy systems,鈥? / IEEE Trans. Fuzzy Syst., vol. 17, no. 3, pp. 544鈥?55, June 2009. CrossRef
  5. W. J. Wang and W. W. Lin, 鈥淒ecentralized PDC for large-scale T-S fuzzy systems,鈥? / IEEE Trans. Fuzzy Syst., vol. 13, no. 6, pp. 779鈥?86, December 2005. CrossRef
  6. H. K. Lam and M. Narimani, 鈥淪tability analysis and performance design for fuzzy-model-based control system under imperfect premise matching,鈥? / IEEE Trans. Fuzzy Syst., vol. 17, no. 4, pp. 949鈥?61, August 2009. CrossRef
  7. C. C. Ku, P. H. Huang, and W. J. Chang 鈥淧assive fuzzy controller design for nonlinear systems with multiplicative noises,鈥? / Journal of the Franklin Institute 鈥?Engineering and Applied Mathematics, vol. 347, no. 5, pp. 732鈥?50, January 2010. CrossRef
  8. W. J. Chang, C. C. Ku, and P. H. Huang, 鈥淩obust fuzzy control for uncertain stochastic time-delay Takagi-Sugeno fuzzy models for achieving passivity,鈥? / Fuzzy Sets and Syst., vol. 161, no. 15, pp. 2012鈥?032, August 2010. CrossRef
  9. W. J. Chang, C. C. Ku, and P. H. Huang, 鈥淩obust fuzzy control via observer feedback for passive stochastic fuzzy systems with time-delay and multiplicative noise,鈥? / International Journal of Innovative Computing, Information and Control, vol. 7, no. 1, pp. 345鈥?64, January 2011.
  10. W. J. Chang, W. Y. Wu, and C. C. Ku, 鈥?em class="a-plus-plus">H 鈭?/sub> constrained fuzzy control via state observer feedback for discrete-time Takagi-Sugeno fuzzy systems with multiplicative noises,鈥? / ISA Trans., vol. 50, no. 1, pp. 37鈥?3, January 2011. CrossRef
  11. G. Eli, S. Uri, and Y. Isaac, / H 鈭?/sub> / Control and Estimation of State-Multiplicative Linear Systems, Springer, London, 2005.
  12. M. Wu, Y. He, and J. H. She, / Stability Analysis and Robust Control of Time-delay Systems, Springer-Verlag, Berlin, Heidelberg, 2009.
  13. F. O. Souza, L. A. Mozelli, and R. M. Palhares, 鈥淥n stability and stabilization of T-S fuzzy timedelayed systems,鈥? / IEEE Trans. Fuzzy Syst., vol. 17, no. 6, pp. 1450鈥?455, December 2009. CrossRef
  14. C. Lin, Q. G. Wang, T. H. Lee, and Y. He, 鈥淒esign of observer-based / H 鈭?/sub> control for fuzzy time-delay systems,鈥? / IEEE Trans. Fuzzy Syst., vol. 16, no. 2, pp. 534鈥?43, April 2008. CrossRef
  15. W. J. Chang and W. Chang, 鈥淪ynthesis of nonlinear discrete control systems via time-delay affine Takagi-Sugeno fuzzy models,鈥? / ISA Trans., vol. 44, no. 2, pp. 243鈥?57, April 2005. CrossRef
  16. X. L. Zhu and G. H. Yang, 鈥淛ensen inequality approach to stability analysis of discrete-time system with time-varying delay,鈥? / Proc. of American Control Conference, pp. 1644鈥?649, June 2008.
  17. S. Ma and E. K. Boukas, 鈥淪tability and robust stabilisation for uncertain discrete stochastic hybrid singular systems with time delay,鈥? / Proc. of IET Control Theory and Applications, vol. 3, no. 9, pp. 1217鈥?225, January 2009. CrossRef
  18. Z. Ji, Y. Zhou, and Y. Shen, 鈥淪tabilization of a class of fuzzy control systems via piecewise fuzzy Lyapunov function approach,鈥? / Proc. of American Control Conference, pp. 4065鈥?070, July 2007.
  19. K. Tanaka, H. Ohtake, and H. O. Wang, 鈥淎 descriptor system approach to fuzzy control system design via fuzzy Lyapunov functions,鈥? / IEEE Trans. Fuzzy Syst., vol. 15, no. 3, pp. 333鈥?41, June 2007. CrossRef
  20. K. J. Yang, K. S. Hong, and F. Matsuno, 鈥淓nergybased control of axially translating beams: varying tension, varying speed, and disturbance adaptation,鈥? / IEEE Trans. Control Syst. Technology, vol. 13, no. 6, pp. 1045鈥?054, November 2005. CrossRef
  21. Y. Wang, D. Cheng, C. Li, and Y. Ge, 鈥淒issipative Hamiltonian realization and energy-based / L 2-disturbance attenuation control of multimachine power systems,鈥? / IEEE Trans. Automatic Control, vol. 48, no. 8, pp. 1428鈥?433, August 2003. CrossRef
  22. R. Lozano, B. Brogliato, O. Egeland, and B. Maschke, / Dissipative Systems Analysis and Control Theory and Application, Springer, London, 2000. CrossRef
  23. L. El Ghaoui, F. Oustry, and M. A. Rami, 鈥淎 cone complementarity linearization algorithm for static output-feedback and related problems,鈥? / IEEE Trans. Automatic Control, vol. 42, no. 8, pp. 1171鈥?176, August 1997. CrossRef
  24. S. Boyd, L. E. Ghaoui, E. Feron, and V. Balakrishnan, / Linear Matrix Inequalities in System and Control Theory, SIAM, Philadelphia, PA, 1994. CrossRef
  25. G. Feng, 鈥淣onsynchronized state estimation of discrete time piecewise linear systems,鈥? / IEEE Trans. Signal Processing, vol. 54, no. 1, pp. 295鈥?03, January 2006. CrossRef
  26. M. Chen, G. Feng, H. Ma, and G. Chen, 鈥淒elaydependent / H 鈭?/sub> filter design for discrete-time fuzzy systems with time-varying delays,鈥? / IEEE Trans. Fuzzy Syst., vol. 17, no. 3, pp. 604鈥?16, June 2009. CrossRef</sub>
  
• 作者单位：Cheung-Chieh Ku (1)
  Wen-Jer Chang (1)
  Chun-Hung Lin (1)
  Yao-Chung Chang (1)
  
  1. Department of Marine Engineering, National Taiwan Ocean University, 2 Pei-Ning Road, Keelung, Taiwan, 20224, R.O.C.
  
• ISSN：2005-4092

文摘

This paper investigates a fuzzy controller design method for discrete-time nonlinear stochastic time-delay systems which are presented by the Takagi-Sugeno (T-S) fuzzy model with multiplicative noises. Utilizing the proposed design method, the fuzzy controller can be carried out via not only state feedback scheme but also output feedback scheme. Both of them are accomplished by the concept of imperfect premise matching (IPM). For discussing the stabilization problem, the Lyapunov-Krasovskii function and passivity theory are applied to derive the sufficient conditions. Moreover, the discrete Jensen inequality is employed to decrease the conservatism of the proposed method. Finally, a numerical example for the control of a nonlinear time-delay pendulum system is provided to show the effectiveness and usefulness of the proposed design method.