Compactly homogeneous space: Difference between revisions

Latest revision as of 00:33, 26 November 2008

This article defines a property of topological spaces: a property that can be evaluated to true/false for any topological space|View a complete list of properties of topological spaces

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Definition

Symbol-free definition

A topological space is termed compactly homogeneous if it is connected, and given any two points, there is an open set containing them, whose closure is compact, and such that there is a homeomorphism of the topological space which sends one point to the other, and is identity outside the open set.

Relation with other properties

Stronger properties

Euclidean space: For full proof, refer: Euclidean implies compactly homogeneous

Weaker properties

Homogeneous space

Facts

If a topological space is connected, Hausdorff and if every point has a compactly homogeneous neighbourhood, then the topological space is homogeneous.
Euclidean space is compactly homogeneous, and hence, any connected manifold is compactly homogeneous.

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 A [[topological space]] is termed '''compactly homogeneous''' if it is [[connected space|connected]], and given any two points, there is an open set containing them, whose closure is compact, and such that there is a homeomorphism of the topological space which sends one point to the other, and is identity outside the open set.
+==Relation with other properties==
+===Stronger properties===
+* [[Weaker than::Euclidean space]]: {{proofat|[[Euclidean implies compactly homogeneous]]}}
+===Weaker properties===
+* [[Homogeneous space]]
 ==Facts==