Using the notion of forward and backward arithmetic convergence in asymmetric metric space, we define arithmetic $ff$-continuity and arithmetic $fb$-continuity and prove some interesting results in asymmetric metric space. Finally, we introduce the concept of forward (or backward) arithmetic compactness and give some interesting results in asymmetric metric space
AbstractAn Arzelà–Ascoli theorem for asymmetric metric spaces (sometimes called quasi-metric spaces)...
In the literature completeness for symmetric spaces is done through the classical Cauchy criterion f...
Abstract. We study convergence properties of asymptotic directions of unbounded sets in normed space...
AbstractAn Arzelà–Ascoli theorem for asymmetric metric spaces (sometimes called quasi-metric spaces)...
In a recent paper [17] we studied asymmetric metric spaces; in this context we studied the length of...
William Henry Ruckle introduced the notion of arithmetic convergence in the sense that a sequence d...
An asymmetric space is a set endowed with a distance that does not satisfy the axiom of symmetry. Th...
Abstract We prove an Ascoli-type theorem, giving a necessary and sufficient condition for forward co...
In a recent paper we studied \emph{asymmetric metric spaces}; in this context we studied the le...
summary:Mappings preserving Cauchy sequences and certain types of convergences connected with these ...
summary:Mappings preserving Cauchy sequences and certain types of convergences connected with these ...
The classical Cauchy completion of a metric space (by means of Cauchy sequences) as well as the comp...
In this paper, we proved some fixed point results for maps in quasi-pseudometric spaces. The theorem...
Includes abstract.Includes bibliographical references.The aim of the thesis is to investigate aspect...
Following ideas of Dugundji and Granas, some general results are established on the existence of fix...
AbstractAn Arzelà–Ascoli theorem for asymmetric metric spaces (sometimes called quasi-metric spaces)...
In the literature completeness for symmetric spaces is done through the classical Cauchy criterion f...
Abstract. We study convergence properties of asymptotic directions of unbounded sets in normed space...
AbstractAn Arzelà–Ascoli theorem for asymmetric metric spaces (sometimes called quasi-metric spaces)...
In a recent paper [17] we studied asymmetric metric spaces; in this context we studied the length of...
William Henry Ruckle introduced the notion of arithmetic convergence in the sense that a sequence d...
An asymmetric space is a set endowed with a distance that does not satisfy the axiom of symmetry. Th...
Abstract We prove an Ascoli-type theorem, giving a necessary and sufficient condition for forward co...
In a recent paper we studied \emph{asymmetric metric spaces}; in this context we studied the le...
summary:Mappings preserving Cauchy sequences and certain types of convergences connected with these ...
summary:Mappings preserving Cauchy sequences and certain types of convergences connected with these ...
The classical Cauchy completion of a metric space (by means of Cauchy sequences) as well as the comp...
In this paper, we proved some fixed point results for maps in quasi-pseudometric spaces. The theorem...
Includes abstract.Includes bibliographical references.The aim of the thesis is to investigate aspect...
Following ideas of Dugundji and Granas, some general results are established on the existence of fix...
AbstractAn Arzelà–Ascoli theorem for asymmetric metric spaces (sometimes called quasi-metric spaces)...
In the literature completeness for symmetric spaces is done through the classical Cauchy criterion f...
Abstract. We study convergence properties of asymptotic directions of unbounded sets in normed space...
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