Title :
The G-differentiability and geometric properties of the Zadeh extensions of functions
Author_Institution :
Sch. of Sci., Hangzhou Inst. of Electron. Eng., China
Abstract :
In this paper, the concepts of right G-derivative, left G-derivative and G-derivative (with respect to a direction) of fuzzy number mappings are introduced, and some properties of continuity, monotonicity, convexity (or concavity) and G-differentiability of fuzzy number mappings are given. After that, the continuity, monotonicity and convexity (or concavity) of the Zadeh extensions F (is restricted to fuzzy number space E) of a function f are characterized by the continuity, monotonicity and convexity (or concavity) of f, respectively.
Keywords :
differentiation; fuzzy set theory; geometry; G-differentiability properties; Zadeh extensions; fuzzy number mappings; fuzzy number space; geometric properties; left G-derivative; right G-derivative; Cybernetics; Extraterrestrial measurements; Fuzzy set theory; Fuzzy sets; Mathematics;
Conference_Titel :
Machine Learning and Cybernetics, 2004. Proceedings of 2004 International Conference on
Print_ISBN :
0-7803-8403-2
DOI :
10.1109/ICMLC.2004.1382077
