Symmetrically connected and antisymmetrically connected \(T_0\)-quasi-metric extensions
DOI10.1016/j.topol.2020.107179zbMath1481.54017OpenAlexW3014937476MaRDI QIDQ1987231
Filiz Yıldız, Nezakat Javanshir
Publication date: 14 April 2020
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.topol.2020.107179
isometryremainder\(T_0\)-quasi-metricsymmetric pairantisymmetric pathantisymmetric pointantisymmetrically connected extensionconnected complementary graphsymmetrically connected spacesymmetry graph
Metric spaces, metrizability (54E35) Extensions of spaces (compactifications, supercompactifications, completions, etc.) (54D35) Connected and locally connected spaces (general aspects) (54D05) Remainders in general topology (54D40) Connectivity (05C40)
Related Items (4)
Cites Work
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- Extensions of \(T_0\)-quasi-metrics
- The connectivity of a graph and its complement
- Asymmetric distances, semidirected networks and majority in Fermat-Weber problems
- Connectifications of metrizable spaces
- Splitting ultra-metrics by \(T_{0}\)-ultra-quasi-metrics
- Symmetric connectedness in \(T_0\)-quasi-metric spaces
- Convexity structures in \(T_{0}\)-quasi-metric spaces
- A study on quasi-pseudometrics
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