A Subjective and Objective Constructing Approach for Reasonable Membership Function Based on Mathematical Programming
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[1] Hideki Katagiri,et al. An Interactive Algorithm to Construct an Appropriate Nonlinear Membership Function Using Information Theory and Statistical Method , 2015, Complex Adaptive Systems.
[2] E. Hisdal. Infinite-valued logic based on two-valued logic and probability : part 1.4. the TEE model for grades of membership , 1990 .
[3] Hiroe Tsubaki,et al. Constructing an appropriate membership function integrating fuzzy shannon entropy and human's interval estimation , 2014 .
[4] H. D. Cheng,et al. Automatically Determine the Membership Function Based on the Maximum Entropy Principle , 1997, Inf. Sci..
[5] H. Trussell,et al. Constructing membership functions using statistical data , 1986 .
[6] Ayumi Yoshikawa. Influence of Procedures for Interactive Identification Method on Forms of Identified Membership Functions , 2007 .
[7] Hideki Katagiri,et al. A Constructing Algorithm for Appropriate Piecewise Linear Membership Function based on Statistics and Information Theory , 2015, KES.
[8] V. V. S. Sarma,et al. Estimation of fuzzy memberships from histograms , 1985, Inf. Sci..
[9] Heng-Da Cheng,et al. Thresholding based on fuzzy partition of 2D histogram , 1998, Proceedings. Fourteenth International Conference on Pattern Recognition (Cat. No.98EX170).
[10] Ellen Hisdal,et al. Infinite-Valued Logic Based on Two-Valued Logic and Probability. Part 1.2: Different Sources of Fuzziness , 1986, Int. J. Man Mach. Stud..
[11] James C. Bezdek,et al. Measuring fuzzy uncertainty , 1994, IEEE Trans. Fuzzy Syst..
[12] I. Maung. A note on measures of fuzziness applied to nonmonotonic fuzzy propositional logic , 1994 .
[13] Gleb Beliakov. Fuzzy Sets and Membership Functions Based on Probabilities , 1996, Inf. Sci..
[14] Fakhri Karray,et al. Fuzzy entropy: a brief survey , 2001, 10th IEEE International Conference on Fuzzy Systems. (Cat. No.01CH37297).
[15] Bohdan S. Butkiewicz,et al. A Method for Automatic Membership Function Estimation Based on Fuzzy Measures , 2007, IFSA.
[16] Jean-Lou Chameau,et al. Membership functions I: Comparing methods of measurement , 1987, Int. J. Approx. Reason..