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
AbstractIn this paper, we introduce a partial order on a cone metric space and prove a Caristi-type ...
AbstractEach metric space is a regular cone metric space. We shall extend a result about Meir–Keeler...
AbstractIn this work, Cantor’s intersection theorem is extended to cone metric spaces and as an appl...
AbstractIt is well known that any metric space is paracompact. As a generalization of metric spaces,...
AbstractRecently, Ayse Sonmez [A. Sonmez, On paracompactness in cone metric spaces, Appl. Math. Lett...
AbstractIn this work, we will prove the Dugundji extension theorem for the cone metric space. It is ...
AbstractRecently, D. Ilić and V. Rakočević [D. Ilić, V. Rakočević, Quasi-contraction on a cone metri...
AbstractHuang and Zhang reviewed cone metric spaces in 2007 [Huang Long-Guang, Zhang Xian, Cone metr...
AbstractIn this paper we introduce cone metric spaces, prove some fixed point theorems of contractiv...
AbstractIn this paper we extend a fixed point theorem of Imdad and Kumar, for a pair of non-self map...
AbstractWe have shown in this paper that a (complete) cone metric space (X,E,P,d) is indeed (complet...
AbstractThe purpose of this paper is to characterize a topologica space Y with the property that the...
AbstractFor any cardinal κ, if X is the box product of a family of discrete spaces in the κ-box topo...
In this paper we prove a fixed point theorem in cone metric spaces, which is an extension of metric ...
AbstractCharacterization of ω1-metrizable spaces whose product with every paracompact space is parac...
AbstractIn this paper, we introduce a partial order on a cone metric space and prove a Caristi-type ...
AbstractEach metric space is a regular cone metric space. We shall extend a result about Meir–Keeler...
AbstractIn this work, Cantor’s intersection theorem is extended to cone metric spaces and as an appl...
AbstractIt is well known that any metric space is paracompact. As a generalization of metric spaces,...
AbstractRecently, Ayse Sonmez [A. Sonmez, On paracompactness in cone metric spaces, Appl. Math. Lett...
AbstractIn this work, we will prove the Dugundji extension theorem for the cone metric space. It is ...
AbstractRecently, D. Ilić and V. Rakočević [D. Ilić, V. Rakočević, Quasi-contraction on a cone metri...
AbstractHuang and Zhang reviewed cone metric spaces in 2007 [Huang Long-Guang, Zhang Xian, Cone metr...
AbstractIn this paper we introduce cone metric spaces, prove some fixed point theorems of contractiv...
AbstractIn this paper we extend a fixed point theorem of Imdad and Kumar, for a pair of non-self map...
AbstractWe have shown in this paper that a (complete) cone metric space (X,E,P,d) is indeed (complet...
AbstractThe purpose of this paper is to characterize a topologica space Y with the property that the...
AbstractFor any cardinal κ, if X is the box product of a family of discrete spaces in the κ-box topo...
In this paper we prove a fixed point theorem in cone metric spaces, which is an extension of metric ...
AbstractCharacterization of ω1-metrizable spaces whose product with every paracompact space is parac...
AbstractIn this paper, we introduce a partial order on a cone metric space and prove a Caristi-type ...
AbstractEach metric space is a regular cone metric space. We shall extend a result about Meir–Keeler...
AbstractIn this work, Cantor’s intersection theorem is extended to cone metric spaces and as an appl...
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