Add to ORKGConvexity in metric space is the main topic of discussion in this thesis. To undertake the study we have studied extensively the means introduced by Doss and included the results concerning means derived by Gahier and Murphy. We use this definition of a mean to define a new notion of convexity on a metric space, called B-convexity. B-convexity has been compared with other notions of convexity on a metric space. Finally following a construction given by Machado, we show that a B-convex metric space, satisfying certain properties, is essentially a convex subset of a normed space and the space is unique
The notion of strict convexity in metric spaces was introduced in [1] and certain existence and uniq...
[EN] In this paper we introduce the notion of canonical partial metric associated to a norm to study...
In this work, we define the nearly uniform convexity and the D-uniform convexity in metric spaces, a...
Convexity is a concept usually developed in vector spaces. However since the seventies of the 20th c...
AbstractWe show that Takahashi's idea of convex structures on metric spaces is a natural generalizat...
Abstract. We consider two different notions of convexity of metric spaces, namely (strict/uniform) b...
Convexity is a concept usually developed in vector spaces. However since the seventies of the 20th c...
AbstractWe show that Takahashi's idea of convex structures on metric spaces is a natural generalizat...
Axiomatic convexity space, introduced by Kay and Womble [22] , will be the main topic discussed in ...
We show that Takahashi's idea of convex structures on metric spaces is a natural generalization of c...
Abstract. Constructive properties of uniform convexity, strict convexity, near convexity, and metric...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
Convexity is an old subject in mathematics. The �rst speci�c de�nition of convexity was given by He...
We study questions concerning convexity and the existence of the nearest point for a given set in sp...
The notion of strict convexity in metric spaces was introduced in [1] and certain existence and uniq...
[EN] In this paper we introduce the notion of canonical partial metric associated to a norm to study...
In this work, we define the nearly uniform convexity and the D-uniform convexity in metric spaces, a...
Convexity is a concept usually developed in vector spaces. However since the seventies of the 20th c...
AbstractWe show that Takahashi's idea of convex structures on metric spaces is a natural generalizat...
Abstract. We consider two different notions of convexity of metric spaces, namely (strict/uniform) b...
Convexity is a concept usually developed in vector spaces. However since the seventies of the 20th c...
AbstractWe show that Takahashi's idea of convex structures on metric spaces is a natural generalizat...
Axiomatic convexity space, introduced by Kay and Womble [22] , will be the main topic discussed in ...
We show that Takahashi's idea of convex structures on metric spaces is a natural generalization of c...
Abstract. Constructive properties of uniform convexity, strict convexity, near convexity, and metric...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
Convexity is an old subject in mathematics. The �rst speci�c de�nition of convexity was given by He...
We study questions concerning convexity and the existence of the nearest point for a given set in sp...
The notion of strict convexity in metric spaces was introduced in [1] and certain existence and uniq...
[EN] In this paper we introduce the notion of canonical partial metric associated to a norm to study...
In this work, we define the nearly uniform convexity and the D-uniform convexity in metric spaces, a...