eralization of the concept of a normed linear space which results when the homogeneity property of the norm, llax ll = ! a! · llxll for any scalar a, is weakened by restricting a to the nonnegative real numbers. Some of the general properties of such spaces have been discussed by Leichtweiss [2]. Quasimetric spaces
This paper is basically concerned with the geometry of normed linear spaces. Approximation enters a...
AbstractBy modifying what “admissible” means in the construction of T, a unified way of obtaining th...
AbstractWe prove that the metric characterization of real normed spaces obtained by T. Oikhberg and ...
ABSTRACT. Let X be a linear space over a field K = R or C, equipped with a metric ρ. It is proved th...
This thesis will centre on the concept of norming subspaces in the dual of a Banach space. We shall ...
In this paper, the neutrosophic norm has been defined on a soft linear space which is hereafter call...
This paper proposed the idea of Neutrosophic norm in a linear space. An attempt has been made to fin...
Mapping the norm . : X � , can be expanded to become the norm-n, withX more than n-1 dimensional ,...
For a Banach space X over the reals, J. Gao defined certain constants for X, the main ones being g(X...
In this article, we considered bidual spaces and reflexivity of real normed spaces. At first we prov...
We study questions concerning convexity and the existence of the nearest point for a given set in sp...
AbstractLet T be the class of Banach spaces E for which every weakly continuous mapping from an α-fa...
Abstract. Constructive properties of uniform convexity, strict convexity, near convexity, and metric...
summary:In this paper we obtain two new characterizations of completeness of a normed space through ...
A class of complete non-Archimedean pseudo-normed linear spaces for which the field of scalars has a...
This paper is basically concerned with the geometry of normed linear spaces. Approximation enters a...
AbstractBy modifying what “admissible” means in the construction of T, a unified way of obtaining th...
AbstractWe prove that the metric characterization of real normed spaces obtained by T. Oikhberg and ...
ABSTRACT. Let X be a linear space over a field K = R or C, equipped with a metric ρ. It is proved th...
This thesis will centre on the concept of norming subspaces in the dual of a Banach space. We shall ...
In this paper, the neutrosophic norm has been defined on a soft linear space which is hereafter call...
This paper proposed the idea of Neutrosophic norm in a linear space. An attempt has been made to fin...
Mapping the norm . : X � , can be expanded to become the norm-n, withX more than n-1 dimensional ,...
For a Banach space X over the reals, J. Gao defined certain constants for X, the main ones being g(X...
In this article, we considered bidual spaces and reflexivity of real normed spaces. At first we prov...
We study questions concerning convexity and the existence of the nearest point for a given set in sp...
AbstractLet T be the class of Banach spaces E for which every weakly continuous mapping from an α-fa...
Abstract. Constructive properties of uniform convexity, strict convexity, near convexity, and metric...
summary:In this paper we obtain two new characterizations of completeness of a normed space through ...
A class of complete non-Archimedean pseudo-normed linear spaces for which the field of scalars has a...
This paper is basically concerned with the geometry of normed linear spaces. Approximation enters a...
AbstractBy modifying what “admissible” means in the construction of T, a unified way of obtaining th...
AbstractWe prove that the metric characterization of real normed spaces obtained by T. Oikhberg and ...