AbstractIt is well known that any metric space is paracompact. As a generalization of metric spaces, cone metric spaces play very important role in fixed point theory, computer science, and some other research areas as well as in general topology. In this paper, a theorem which states that any cone metric space with a normal cone is paracompact is proved
In the Present paper we prove some fixed point theorems in cone metric space our result generalizes ...
AbstractMotivated by the scalarization method in vector optimization theory, we take a new approach ...
AbstractIn their study of relative metric spaces, Arkhangel'skiĭ and Gordienko introduce several rel...
AbstractIt is well known that any metric space is paracompact. As a generalization of metric spaces,...
The purpose of this thesis is to investigate the consequences of paracompactness and pointwise parac...
AbstractRecently, Ayse Sonmez [A. Sonmez, On paracompactness in cone metric spaces, Appl. Math. Lett...
We prove that (i) a collectionwise normal, orthocompact, theta (m)-refinable, [m, N-0]-submetacompac...
The notion of countable (ω)paracompactness is a generalization of the notion of (ω)paracompactness. ...
AbstractFor any cardinal κ, if X is the box product of a family of discrete spaces in the κ-box topo...
ABSTRACT. We shall prove that for a LaSnev space Y the product X x Y is paracompact for any paracom ...
AbstractWe prove that (i) a collectionwise normal, orthocompact, θm-refinable, [m,ℵ0]-submetacompact...
The object of this paper is to generalize the Fixed Point theorems in the partial cone metric spaces...
Cone-valued lower semicontinuous maps are used to generalize Cristi-Kirik’s fixed point theorem to C...
Abstract In this paper, some topological concepts and definitions are generalized to cone metric spa...
In this paper we establish some Fixed Point theorems by altering distances in a complete cone metric...
In the Present paper we prove some fixed point theorems in cone metric space our result generalizes ...
AbstractMotivated by the scalarization method in vector optimization theory, we take a new approach ...
AbstractIn their study of relative metric spaces, Arkhangel'skiĭ and Gordienko introduce several rel...
AbstractIt is well known that any metric space is paracompact. As a generalization of metric spaces,...
The purpose of this thesis is to investigate the consequences of paracompactness and pointwise parac...
AbstractRecently, Ayse Sonmez [A. Sonmez, On paracompactness in cone metric spaces, Appl. Math. Lett...
We prove that (i) a collectionwise normal, orthocompact, theta (m)-refinable, [m, N-0]-submetacompac...
The notion of countable (ω)paracompactness is a generalization of the notion of (ω)paracompactness. ...
AbstractFor any cardinal κ, if X is the box product of a family of discrete spaces in the κ-box topo...
ABSTRACT. We shall prove that for a LaSnev space Y the product X x Y is paracompact for any paracom ...
AbstractWe prove that (i) a collectionwise normal, orthocompact, θm-refinable, [m,ℵ0]-submetacompact...
The object of this paper is to generalize the Fixed Point theorems in the partial cone metric spaces...
Cone-valued lower semicontinuous maps are used to generalize Cristi-Kirik’s fixed point theorem to C...
Abstract In this paper, some topological concepts and definitions are generalized to cone metric spa...
In this paper we establish some Fixed Point theorems by altering distances in a complete cone metric...
In the Present paper we prove some fixed point theorems in cone metric space our result generalizes ...
AbstractMotivated by the scalarization method in vector optimization theory, we take a new approach ...
AbstractIn their study of relative metric spaces, Arkhangel'skiĭ and Gordienko introduce several rel...
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