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 map

We introduce the notions of m-convex fuzzy mapping and fuzzy integral mean. We study their properties and we give some applications. (~) 2000 Elsevier Science Ltd. All rights reserved.

In this paper we introduce the concepts of pseudo-convexity, invexity and pseudo-invexity for fuzzy mappings of one variable based on the notion of di erentiability proposed by Goetschel and Voxman [4], and investigate the relationship between convex fuzzy mappings, preinvex fuzzy mappings and these

In this paper, we put forward the concepts of directional derivative, di erential and subdi erential of fuzzy mappings from R n into E 1 , and discuss the characterizations of directional derivative and di erential by, respectively, using the directional derivative and di erential of two crisp funct