https://orcid.org/0000-0002-1928-5742
References
- Baang, D., Choi, J. Y., & Shim, H. (2007). Perfect tracking control for linear systems with state constraint. International Journal of Control, Automation, and Systems, 5(2), 218–222.
- Buehner, M. R., & Young, P. M. (2010, June 30–July 2). Perfect tracking for non-minimum phase systems. Proceedings of the 2010 American Control Conference, Marriott Waterfront, Baltimore, MD (pp. 4010–4015).
- Chen, Y. J., Tanaka, M., Tanaka, K., Ohtake, H., & Wang, H. O. (2014). Brief paper-discrete polynomial fuzzy systems control. IET Control Theory and Applications, 8(4), 288–296.
- Chen, Y. J., Tanaka, M., Tanaka, K., & Wang, H. O. (2015). Stability analysis and region-of-attraction estimation using piecewise polynomial Lyapunov functions: Polynomial fuzzy model approach. IEEE Transactions on Fuzzy Systems, 23(4), 1314–1322.
- Cheng, X., Wang, P., Liu, L., & Tang, G. (2015). Predictive sliding mode control using feedback linearization for hypersonic vehicle. Procedia Engineering, 99, 1076–1081.
- Filev, D. P., & Yager, R. R. (1991). A generalized defuzzification method via BAD distributions. International Journal of Intelligent Systems, 6(7), 687–697.
- Gao, Y., Shi, P., Li, H., & Nguang, S. K. (2015). Output tracking control for fuzzy delta operator systems with time-varying delays. Journal of the Franklin Institute, 352(7), 2951–2970.
- Han, H., Chen, J., & Karimi, H. R. (2017). State and disturbance observers-based polynomial fuzzy controller. Information Sciences, 382–383, 38–59.
- Heusden, K. V., Ansermino, J. M., & Dumont, G. A. (2018). Performance of robust PID and Q-design controllers for propofol anesthesia. IFAC-PapersOnLine, 51(4), 78–83.
- Isidori, A. (1989). Nonlinear control systems. New York, NY: Springer-Verlag.
- Kang, H. J., Kwon, C., Lee, H., & Park, M. (1998). Robust stability analysis and design method for the fuzzy feedback linearization regulator. IEEE Transactions on Fuzzy Systems, 6(4), 464–472.
- Kang, H. J., Kwon, C., Yee, Y. H., & Park, M. (1997, July 5). L2 robust stability analysis for the fuzzy feedback linearization regulator. Proceedings of 6th International Fuzzy Systems Conference, Barcelona (pp. 277–280).
- Khalil, H. K. (1996). Noninear systems. Upper Saddle River, NJ: Prentice-Hall.
- Khooban, M. H. (2014). Design an intelligent proportional-derivative (PD) feedback linearization control for nonholonomic-wheeled mobile robot. Journal of Intelligent and Fuzzy Systems, 26(4), 1833–1843.
- Lam, H. K., & Li, H. (2013). Output-feedback tracking control for polynomial fuzzy-model-based control systems. IEEE Transactions on Industrial Electronics, 60(12), 5830–5840.
- Lam, H. K., Seneviratne, L. D., & Ban, X. (2012). Fuzzy control of non-linear systems using parameter-dependent polynomial fuzzy model. IET Control Theory and Applications, 6(11), 1645–1653.
- Lee, D., Kim, H. J., & Sastry, S. (2009). Feedback linearization vs. adaptive sliding mode control for a quadrotor helicopter. International Journal of Control, Automation and Systems, 7(3), 419–428.
- Leland, R. P. (1998). Feedback linearization control design for systems with fuzzy uncertainty. IEEE Transactions on Fuzzy Systems, 6(4), 492–503.
- Lian, K. Y., & Liou, J. J. (2006). Output tracking control for fuzzy systems via output feedback design. IEEE Transactions on Fuzzy Systems, 14(5), 628–639.
- Liu, C., Lam, H. K., Ban, X., & Zhao, X. (2016). Design of polynomial fuzzy observer controller with membership functions using unmeasurable premise variables for nonlinear systems. Information Sciences, 355–356, 186–207.
- Mae, M., Ohnishi, W., Fujimoto, H., & Hori, Y. (2019). Perfect tracking control considering generalized controllability indices and application for high-precision stage in translation and pitching. IEEJ Journal of Industry Applications, 8(2), 263–270.
- Moradi, H., & Vossoughi, G. (2015). Robust control of the variable speed wind turbines in the presence of uncertainties: A comparison between H∞ and PID controllers. Energy, 90(2), 1508–1521.
- Nijmeijer, H., & Schaft, V. D. A. (1990). Nonlinear dynamical control systems. New York, NY: Springer-Verlag.
- Park, C. W. (2003). LMI-based robust stability analysis for fuzzy feedback linearization regulators with its applications. Information Sciences, 152(1), 287–301.
- Park, C. W. (2004). Robust stable fuzzy control via fuzzy modeling and feedback linearization with its applications to controlling uncertain single-link flexible joint manipulators. Journal of Intelligent and Robotic Systems, 39(2), 131–147.
- Park, C. W., Kang, H. J., Yee, Y. H., & Park, M. (2002). Numerical robust stability analysis of fuzzy feedback linearisation regulator based on linear matrix inequality approach. IEE Proceedings-Control Theory and Applications, 149(1), 82–88.
- Park, C. W., Moon, C. W., Lee, J. B., Kim, Y. O., & Sung, H. G. (2004, July 25–29). Robust stable feedback linearization of fuzzy modeled nonlinear systems via LMI’s. Proceedings of the 2004 IEEE international conference on Fuzzy Systems, Budapest, Hungary (pp. 1257–1262).
- Perera, L. P., & Guedes Soares, C. (2013). Lyapunov and hurwitz based controls for input-output linearisation applied to nonlinear vessel steering. Ocean Engineering, 66, 58–68.
- Piltan, F., Yarmahmoudi, M. H., Mirzaie, M., & Emamzadeh, S. (2013). Design novel fuzzy robust feedback linearization control with application to robot manipulator. International Journal of Intelligent Systems and Applications, 5(5), 1–10.
- Precup, R. E., Tomescu, M. L., Preitl, S., Petriu, E. M., Fodor, J., & Pozna, C. (2013). Stability analysis and design of a class of MIMO fuzzy control systems. Journal of Intelligent & Fuzzy Systems, 25(1), 145–155.
- Radgolchin, M., & Moeenfard, H. (2018). Development of a multi-level adaptive fuzzy controller for beyond pull-in stabilization of electrostatically actuated microplates. Journal of Vibration and Control, 24(5), 860–878.
- Sala, A., & Ariño, C. (2009). Polynomial fuzzy models for nonlinear control: A Taylor series approach. IEEE Transactions on Fuzzy Systems, 17(6), 1284–1295.
- Slotine, J. J. E., & Li, W. (1991). Applied nonlinear control. Englewood Cliffs, NJ: Prentice-Hall.
- Tanaka, K., Tanaka, M., Chen, Y. J., & Wang, H. O. (2016). A new sum-of-squares design framework for robust control of polynomial fuzzy systems with uncertainties. IEEE Transactions on Fuzzy Systems, 24(1), 94–110.
- Tanaka, K., Yoshida, H., Ohtake, H., & Wang, H. O. (2007, July 9–13). A sum of squares approach to stability analysis of polynomial fuzzy systems. American Control Conference, ACC’07, New York, NY (pp. 4071–4076).
- Tanaka, K., Yoshida, H., Ohtake, H., & Wang, H. O. (2009). A sum-of-squares approach to modeling and control of nonlinear dynamical systems with polynomial fuzzy systems. IEEE Transactions on Fuzzy Systems, 17(4), 911–922.
- Tomizuka, M. (1987). Zero phase error tracking algorithm for digital control. Journal of Dynamic Systems, Measurement, and Control, 109(1), 65–68.
- Tong, S., Sui, S., & Li, Y. (2015). Fuzzy adaptive output feedback control of MIMO nonlinear systems with partial tracking errors constrained. IEEE Transactions on Fuzzy Systems, 23(4), 729–742.
- Vrkalovic, S., Lunca, E. C., & Borlea, I. D. (2018). Model-free sliding mode and fuzzy controllers for reverse osmosis desalination plants. International Journal of Artificial Intelligence, 16(2), 208–222.
- Xu, J. X., Guo, Z. Q., & Lee, T. H. (2012). Design and implementation of a Takagi–Sugeno-type fuzzy logic controller on a two-wheeled mobile robot. IEEE Transactions on Industrial Electronics, 60(12), 5717–5728.
- Ying, H. (1999). Analytical analysis and feedback linearization tracking control of the general Takagi–Sugeno fuzzy dynamic systems. IEEE Transactions on Systems, Man, and Cybernetics, Part C: Applications and Reviews, 29(2), 290–298.
- Zhang, Y., Tao, G., & Chen, M. (2015). Relative degrees and adaptive feedback linearization control of T-S fuzzy systems. IEEE Transactions on Fuzzy Systems, 23(6), 2215–2230.