Unnormalized Interval Type-2 TSK Fuzzy Logic System Design Based on Convexity and Sample Data

Tiechao Wang; Jianqiang Yi

doi:10.20965/jaciii.2011.p0345

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JACIII Vol.15 No.3 pp. 345-350

doi: 10.20965/jaciii.2011.p0345

(2011)

Paper:

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Unnormalized Interval Type-2 TSK Fuzzy Logic System Design Based on Convexity and Sample Data

Tiechao Wang^*,** and Jianqiang Yi^*

^*Institute of Automation, Chinese Academy of Sciences, 95 Zhongguancun East Road, Haidian District, Beijng 100190, China

^**Liaoning University of Technology, Jinzhou, Liaoning 121001, China

Received:

October 28, 2010

Accepted:

December 21, 2010

Published:

May 20, 2011

Keywords:

convexity, interval type-2 fuzzy logic system, least squares algorithm, prior knowledge

Abstract

Prior knowledge of convexity is encoded into a Single-Input Single-Output (SISO) unnormalized interval type-2 Takagi-Sugeno-Kang (TSK) Fuzzy Logic System (FLS) such that the system converges to a given convex target function. After giving sufficient conditions to guarantee convexity with respect to inputs, we show how to combine convexity with Unnormalized Interval Type-2 TSK FLSs (UIT2FLSs) to design convex fuzzy systems enabling derived systems to approach the target function. A simulation example demonstrates the usefulness of convexity and the advantages of UIT2FLSs in the presence of noise.

Cite this article as:

T. Wang and J. Yi, “Unnormalized Interval Type-2 TSK Fuzzy Logic System Design Based on Convexity and Sample Data,” J. Adv. Comput. Intell. Intell. Inform., Vol.15 No.3, pp. 345-350, 2011.

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References

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This article is published under a Creative Commons Attribution-NoDerivatives 4.0 Internationa License.

[1] [1] P. Lindskog and L. Ljung, “Ensuring Monotonic Gain Characteristic in Estimated Models by Fuzzy Model Structures,” Automatica, Vol.36, pp. 311-317, Jun. 2000.

[2] [2] Q. Liang and J.M.Mendel, “Equalization of nonlinear time-varying channels using type-2 fuzzyadaptive filters,” IEEE Trans. on Fuzzy Systems, Vol.8, pp. 551-563, Oct. 2000.

[3] [3] C. Li, J. Yi, and D. Zhao, “Design of Interval Type-2 Fuzzy Logic System Using Sampled Data and Prior Knowledge,” ICIC Express Letters, Vol.3, pp. 695-700, Sep. 2009.

[4] [4] J. Kim and J. S. Lee, “Single-input Single-ouput Convex Fuzzy Systems as Universal Approximators for Single-input Single-output Convex Functions,” 2009 IEEE Int. Conf. on Fuzzy Systems, Jeju Island, Korea, pp. 20-24, Aug. 2009.

[5] [5] T.-W. Kim, S. Y. Park, and J. S. Lee, “Parameter Conditions and Least Squares Identification of Single-input Single-output Convex Fuzzy System,” SICE Annual Conf. 2007, Kagawa University, Japan, pp. 568-573, Sep. 2007.

[6] [6] S. Y. Park, “Constrained optimization of fuzzy logic systems with its application to current prediction for automatic crane operations,” Ph.D. Dissertation, Pohang University of Science and Technology, Korea, 1999.

[7] [7] J. M. Mendel, “Uncertain Rule-Based Fuzzy Logic Systems: Introduction and New Directions,” New Jersey: Prentice-Hall, 2001.

[8] [8] J. M. Mendel, “Advances in type-2 fuzzy sets and systems,” Information Sciences, Vol.177, pp. 84-110, Jan. 2007.

[9] [9] C. Li, J. Yi, and D. Zhao, “Analysis and design of monotonic type-2 fuzzy inference system,” 2009 IEEE Int. Conf. on Fuzzy Systems, Jeju Island, Korea, pp. 1193-1198, Aug. 2009.

[10] [10] K. Tanaka, M. Sano, and H. Watanabe, “Modeling and control of carbon monoxide concentration using a neuro-fuzzy technique,” IEEE Trans. on Fuzzy System, Vol.3, pp. 271-279, Aug. 1995.

Unnormalized Interval Type-2 TSK Fuzzy Logic System Design Based on Convexity and Sample Data

Tiechao Wang*,** and Jianqiang Yi*

Tiechao Wang^*,** and Jianqiang Yi^*