Generalized convexity in conformal mappings

The present paper is a continuation of investigations on subbase convexity theory, st arte d in [7] and in [8]. We are now concerned with so-called convexity preserving (cp) mappings, a notion comparable to affine mappings in vector space theory. A first result is a characterization of cp maps in t

The aim of this paper is to show that under a mild semicontinuity assumption (the so-called segmentary epi-closedness), the cone-convex (respectively, cone-quasiconvex) set-valued maps can be characterized in terms of weak cone-convexity (respectively, weak cone-quasiconvexity), i.e., the notions ob

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