Endpoints in \(T_0\)-quasimetric spaces. II.
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Publication:2015718
DOI10.1155/2013/539573zbMath1300.54035OpenAlexW1514850728WikidataQ58917076 ScholiaQ58917076MaRDI QIDQ2015718
Paulus Haihambo, Collins Amburo Agyingi, Hans-Peter A. Künzi
Publication date: 23 June 2014
Published in: Abstract and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2013/539573
Complete metric spaces (54E50) Metric spaces, metrizability (54E35) Extensions of spaces (compactifications, supercompactifications, completions, etc.) (54D35) Uniform structures and generalizations (54E15)
Related Items
The injective hull of ultra-quasi-metric versus \(q\)-hyperconvex hull of quasi-metric space ⋮ The vector lattice structure on the Isbell-convex hull of an asymmetrically normed real vector space ⋮ Endpoints in \(T_0\)-quasi-metric spaces ⋮ A construction of the \(B\)-completion of a \(T_0\)-quasi-metric space
Cites Work
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- Approaching metric domains
- The ultra-quasi-metrically injective hull of a \(T_0\)-ultra-quasi-metric space
- The Katětov construction modified for a \(T_0\)-quasi-metric space
- The Isbell-hull of a di-space
- Extension of uniformly continuous transformations and hyperconvex metric spaces
- Trees, tight extensions of metric spaces, and the cohomological dimension of certain groups: A note on combinatorial properties of metric spaces
- Hyperconvex hulls of metric spaces
- \(q\)-hyperconvexity in quasipseudometric spaces and fixed point theorems
- On tight spans for directed distances
- Endpoints in \(T_0\)-quasi-metric spaces
- Six theorems about injective metric spaces
- Tight spans, Isbell completions and semi-tropical modules
- Functional Analysis in Asymmetric Normed Spaces
- Quantitative Concept Analysis
- Continuous Lattices and Domains
- An Introduction to Metric Spaces and Fixed Point Theory
- Addendum to ‘The Katětov construction modified for a T0-quasi-metric space’
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