Separation of two convex sets in convexity spaces and in straight line spaces

## Abstract In this paper the concepts of strictly convex and uniformly convex normed linear spaces are extended to metric linear spaces. A relationship between strict convexity and uniform convexity is established. Some existence and uniqueness theorems on best approximation in metric linear space

In this paper, a criterion for which the convex hull of is relatively compact is given when is a relatively compact subset of the space R p of fuzzy sets endowed with the Skorokhod topology. Also, some examples are given to illustrate the criterion.

In order to prove fundamental assertions in several fields of mathematics (for instance in functional analysis and in optimization theory) i t is useful to have convenient separation theorems. The purpose of this paper is to give necessary conditions for convexity of sets in a product space which c