Authors: Aarthi Chandramohan, M. V. C. Rao

Abstract:

This paper presents three new methodologies for the basic operations, which aim at finding new ways of computing union (maximum) and intersection (minimum) membership values by taking into effect the entire membership values in a fuzzy set. The new methodologies are conceptually simple and easy from the application point of view and are illustrated with a variety of problems such as Cartesian product of two fuzzy sets, max –min composition of two fuzzy sets in different product spaces and an application of an inverted pendulum to determine the impact of the new methodologies. The results clearly indicate a difference based on the nature of the fuzzy sets under consideration and hence will be highly useful in quite a few applications where different values have significant impact on the behavior of the system.

Keywords: Centroid, fuzzy set operations, intersection, triangular norms , triangular S-norms, union.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1070329

Procedia APA BibTeX Chicago EndNote Harvard JSON MLA RIS XML ISO 690 PDF Downloads 1458

References:

[1] George J.Klir and B. O Yuan, "Fuzzy sets, Fuzzy logic and Fuzzy systems-Selected papers by Lotfi A. Zadeh," 1996. World Scientific Publication Co Pvt Ltd
[2] E.Cox, "The Fuzzy Systems Handbook," Second Edition, AP Professional, New York (1998).
[3] Timothy J.Ross, "Fuzzy Logic with Engineering Applications", McGraw Hill.1997
[4] Witold Pedrycz and Fernando Gomide, "An Introduction to Fuzzy sets- Analysis and Design," 1998.
[5] Zimmerman H.J, "Fuzzy set theory and its applications," Second Edition, Kluwer academic publishers
[6] B.Kovalerchuk and V.Taliansky, "Comparison of empirical and computed values of fuzzy conjunction," Fuzzy sets and systems, 46:49-53, 1992.
[7] U.Thole, H.J.Zimerman, and P.Zysno, "On the suitability of minimum and product operators for the intersection of fuzzy sets," Fuzzy sets and systems, 2:167-180, 1979.
[8] H.J.Zimmerman and P.Zysno, "Latent connectives in human decision making," Fuzzy sets and systems, 4:37-51, 1980.
[9] Harald Dyckhoff and Witold Pedrycz, "Generalized means as model of compensative connectives," Fuzzy sets and systems, 14:143-154, 1984.
[10] Masaharu Mizumoto, "Pictorial representation of fuzzy connectives, parti: cases of t-norms, t-co norms and averaging operators," Fuzzy sets and systems 31:217-242, 1989.