More on Externally q-Hyperconvex Subsets of T₀-Quasi-Metric Spaces

Authors

Collins Amburo Agyingi Department of Mathematical Sciences, University of South Africa, Unisa, 003, P.O. Box 392, Pretoria, South Africa https://orcid.org/0000-0001-7463-1399

DOI:

https://doi.org/10.37256/cm.5420243193

Keywords:

quasi-metric space, q-hyperconvexity, external q-hyperconvexity, q-admissible subset

Abstract

We continue earlier research on T₀-quasi-metric spaces which are externally q-hyperconvex. We focus on external q-hyperconvex subsets of T₀-quasi-metric spaces in particular. We demonstrate that a countable family of pairwise intersecting externally q-hyperconvex subsets has a non-empty intersection that is external q-hyperconvex under specific requirements on the underlying space (see Proposition 22). Last but not least, we demonstrate that if A is a subset of a supseparable and externally q-hyperconvex space Y, where Y ⊆ X, then A is also externally q-hyperconvex in X (Proposition 25).

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Published

2024-10-16

Issue

Contemporary Mathematics, Volume 5 Issue 4 (2024), 4132-6581

Section

Research Article

License

This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

More on Externally q-Hyperconvex Subsets of T0-Quasi-Metric Spaces. Contemp. Math. [Internet]. 2024 Oct. 16 [cited 2025 Dec. 24];5(4):4285-94. Available from: https://ojs353.mebyme.cn/index.php/CM/article/view/3193

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