Manifold: Difference between revisions

Revision as of 00:32, 27 October 2007

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

Definition

A topological space is said to be a manifold if it satisfies the following equivalent conditions:

It is Hausdorff
It is second-countable
It is locally Euclidean, viz every point has a neighbourhood that is homeomorphic to some open set in Euclidean space. If the topological space is connected, the dimension of the Euclidean space is the same for all points

Relation with other properties

Stronger properties

Weaker properties

Locally Euclidean space
Polyhedron
CW-space
Metrizable space
Perfectly normal space (and all separation axioms sitting below it)
Locally contractible space

Metaproperties

Products

This property of topological spaces is closed under taking finite products

A direct product of manifolds is again a manifold. Fill this in later

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 * It is [[second-countable space|second-countable]]
 * It is [[locally Euclidean space|locally Euclidean]], viz every point has a neighbourhood that is homeomorphic to some open set in Euclidean space. If the topological space is connected, the dimension of the Euclidean space is the same for all points
+==Relation with other properties==
+===Stronger properties===
+===Weaker properties===
+* [[Locally Euclidean space]]
+* [[Polyhedron]]
+* [[CW-space]]
+* [[Metrizable space]]
+* [[Perfectly normal space]] (and all separation axioms sitting below it)
+* [[Locally contractible space]]
 ==Metaproperties==