An Embedding Theorem for Certain Spaces with an Equidistant Property
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Publication:4104562
DOI10.2307/2042061zbMath0336.54032OpenAlexW4256530076MaRDI QIDQ4104562
Publication date: 1976
Full work available at URL: https://doi.org/10.2307/2042061
Topological spaces with richer structures (54E99) Topological characterizations of particular spaces (54F65) Special properties of topological spaces (54F99) Embedding (54C25)
Related Items (5)
Unnamed Item ⋮ The double midset conjecture for continua in the plane ⋮ \((m, n)\)-equidistant sets in \(\mathbb{R}^{k},\mathbb{S}^{k}\), and \(\mathbb P^k\) ⋮ Equidistant Sets in Plane Triodic Continua ⋮ No continuum in \(E^ 2\) has the TMP. II: Triodic continua
Cites Work
- Unnamed Item
- Unnamed Item
- Characterizing a Curve with the Double Midset Property
- Characterizing a Circle with the Double Midset Property
- Generalized midset properties characterize geodesic circles and intervals
- On Subsets of a Continuous Curve which Lie on an Arc of the Continuous Curve
- A new definition of the circle by the use of bisectors
- On convex metric spaces I
- Characterizations of metric spaces by the use of their midsets: intervals
- Convex Metric Spaces with 0-Dimensional Midsets
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