Add to ORKGIn this work, we define the nearly uniform convexity and the D-uniform convexity in metric spaces, and prove their equivalence. We also prove the nonlinear version of some classical results related to nearly uniformly convex metric spaces
MSc (Mathematics), North-West University, Mafikeng CampusIn this MSc dissertation, we generalize the...
Convexity is a concept usually developed in vector spaces. However since the seventies of the 20th c...
summary:The notion of a metric bead space was introduced in the preceding paper (L. Pasicki: Bead sp...
In this paper, we define a metric on our new space and then show that this linear metric space is k-...
Equivalent formulations for strictly convex, uniformly convex and locally uniformly convex metric li...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
In this paper the theory of uniformly convex metric spaces is developed. These spaces exhibit a gene...
Abstract. We consider two different notions of convexity of metric spaces, namely (strict/uniform) b...
[EN] In this paper we introduce the notion of canonical partial metric associated to a norm to study...
[EN] In this paper we introduce the notion of canonical partial metric associated to a norm to study...
The notion of strict convexity in metric spaces was introduced in [1] and certain existence and uniq...
AbstractWe show that Takahashi's idea of convex structures on metric spaces is a natural generalizat...
We show that Takahashi's idea of convex structures on metric spaces is a natural generalization of c...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
search Reports A577 (2009). Abstract: We introduce a property of Banach spaces, called uniform conve...
MSc (Mathematics), North-West University, Mafikeng CampusIn this MSc dissertation, we generalize the...
Convexity is a concept usually developed in vector spaces. However since the seventies of the 20th c...
summary:The notion of a metric bead space was introduced in the preceding paper (L. Pasicki: Bead sp...
In this paper, we define a metric on our new space and then show that this linear metric space is k-...
Equivalent formulations for strictly convex, uniformly convex and locally uniformly convex metric li...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
In this paper the theory of uniformly convex metric spaces is developed. These spaces exhibit a gene...
Abstract. We consider two different notions of convexity of metric spaces, namely (strict/uniform) b...
[EN] In this paper we introduce the notion of canonical partial metric associated to a norm to study...
[EN] In this paper we introduce the notion of canonical partial metric associated to a norm to study...
The notion of strict convexity in metric spaces was introduced in [1] and certain existence and uniq...
AbstractWe show that Takahashi's idea of convex structures on metric spaces is a natural generalizat...
We show that Takahashi's idea of convex structures on metric spaces is a natural generalization of c...
AbstractIn this paper the concepts of strictly convex and uniformly convex normed linear spaces are ...
search Reports A577 (2009). Abstract: We introduce a property of Banach spaces, called uniform conve...
MSc (Mathematics), North-West University, Mafikeng CampusIn this MSc dissertation, we generalize the...
Convexity is a concept usually developed in vector spaces. However since the seventies of the 20th c...
summary:The notion of a metric bead space was introduced in the preceding paper (L. Pasicki: Bead sp...