论文信息 - Fuzzy Weirstrass theorem and convex fuzzy mappings

Fuzzy Weirstrass theorem and convex fuzzy mappings

The convexity and continuity of fuzzy mappings are defined through a linear ordering and a metric on the set of fuzzy numbers. The local-global minimum property of real-valued convex functions is extended to convex fuzzy mappings. It is proved that a strict local minimizer of a quasiconvex fuzzy mapping is also a strict global minimizer. Characterizations for convex fuzzy mappings and quasiconvex fuzzy mappings are given. In addition, the Weirstrass theorem is extended from real-valued functions to fuzzy mappings.

E. Stanley Lee | Yu-Ru Syau

[1] P. Kloeden,et al. Metric spaces of fuzzy sets , 1990 .

[2] Hong Yan,et al. A class of convex fuzzy mappings , 2002, Fuzzy Sets Syst..

[3] Cheng Zhang,et al. Convex fuzzy mapping and operations of convex fuzzy mappings , 2006, Comput. Math. Appl..

[4] P. Kloeden,et al. Metric Spaces Of Fuzzy Sets Theory And Applications , 1975 .

[5] S. Nanda,et al. Convex fuzzy mappings , 1992 .

[6] Yu-Ru Syau,et al. On convex and concave fuzzy mappings , 1999, Fuzzy Sets Syst..

[7] R. Goetschel,et al. Elementary fuzzy calculus , 1986 .

[8] Nagata Furukawa. Convexity and local Lipschitz continuity of fuzzy-valued mappings , 1998, Fuzzy Sets Syst..