Moore plane: Difference between revisions
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==Topological space properties== | ==Topological space properties== | ||
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! Property !! Satisfied? !! Explanation !! Corollary properties satisfied/dissatisfied | |||
|- | |||
! Separation type | |||
|- | |||
| [[satisfies property::completely regular space]] || Yes || [[Moore plane is completely regular]] || satisfies: [[satisfies property::regular space]], [[satisfies property::Hausdorff space]], [[satisfies property::T1 space]], [[satisfies property::Urysohn space]], [[satisfies property::Kolmogorov space]] | |||
|- | |||
| [[satisfies property::locally normal space]] || Yes || [[Moore plane is locally normal]] || | |||
|- | |||
| [[dissatisfies property::normal space]] || No || [[Moore plane is not normal]] || dissatisfies: [[dissatisfies property::metrizable space]], [[dissatisfies property::CW-space]], [[dissatisfies property::hereditarily normal space]] | |||
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| [[dissatisfies property::collectionwise Hausdorff space]] || No || [[Moore plane is not collectionwise Hausdorff]] -- the bounding line is an uncountable discrete subset || | |||
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! Countability type | |||
|- | |||
| [[satisfies property::separable space]] || Yes || Any dense subset of the upper half plane in the usual topology is also dense in the Moore plane. || | |||
|- | |||
| [[satisfies property::first-countable space]] || Yes || We can, at any point, take a local basis that only uses disks of rational radius (use tangent disks for points on the bounding line) || | |||
|- | |||
| [[dissatisfies property::hereditarily separable space]] || No || the bounding line is an uncountable discrete subset || | |||
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! Compactness type | |||
|- | |||
| [[satisfies property::countably metacompact space]] || Yes || [[Moore plane is countably metacompact]] || | |||
|- | |||
| [[dissatisfies property::metacompact space]]|| No || [[Moore plane is not metacompact]] || dissatisfies: [[dissatisfies property::paracompact space]], [[dissatisfies property::compact space]] | |||
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==External links== | ==External links== | ||
Latest revision as of 18:25, 26 January 2012
This article describes a standard counterexample to some plausible but false implications. In other words, it lists a pathology that may be useful to keep in mind to avoid pitfalls in proofs
View other standard counterexamples in topology
Definition
The Moore plane or Niemitzky plane or tangent disk topology is defined as follows: as a set, it is the upper half-plane, along with the bounding real line. The topology is described by the following basis:
- All open disks that lie completely inside the upper half-plane
- For points which are on the bounding line, the union of such a point with an open disk tangent to the bounding line at that point
Topological space properties
| Property | Satisfied? | Explanation | Corollary properties satisfied/dissatisfied |
|---|---|---|---|
| Separation type | |||
| completely regular space | Yes | Moore plane is completely regular | satisfies: regular space, Hausdorff space, T1 space, Urysohn space, Kolmogorov space |
| locally normal space | Yes | Moore plane is locally normal | |
| normal space | No | Moore plane is not normal | dissatisfies: metrizable space, CW-space, hereditarily normal space |
| collectionwise Hausdorff space | No | Moore plane is not collectionwise Hausdorff -- the bounding line is an uncountable discrete subset | |
| Countability type | |||
| separable space | Yes | Any dense subset of the upper half plane in the usual topology is also dense in the Moore plane. | |
| first-countable space | Yes | We can, at any point, take a local basis that only uses disks of rational radius (use tangent disks for points on the bounding line) | |
| hereditarily separable space | No | the bounding line is an uncountable discrete subset | |
| Compactness type | |||
| countably metacompact space | Yes | Moore plane is countably metacompact | |
| metacompact space | No | Moore plane is not metacompact | dissatisfies: paracompact space, compact space |