Space with perfect fundamental group: Difference between revisions
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==Definition== | ==Definition== | ||
A [[topological space]] is said to have ''' | A [[topological space]] is said to have '''perfect fundamental group''' if it satisfies the following equivalent conditions: | ||
* It is [[path-connected space|path-connected]], and its [[fundamental group]] is [[perfect group|perfect]] | * It is [[path-connected space|path-connected]], and its [[fundamental group]] is [[perfect group|perfect]] | ||
Latest revision as of 19:58, 11 May 2008
This article defines a homotopy-invariant property of topological spaces, i.e. a property of homotopy classes of topological spaces
View other homotopy-invariant properties of topological spaces OR view all properties of topological spaces
This property of topological spaces is defined as the property of the following associated group: fundamental group having the following group property: perfect group
This property of topological spaces is defined as the property of the following associated group: first homology group having the following group property: trivial group
Definition
A topological space is said to have perfect fundamental group if it satisfies the following equivalent conditions:
- It is path-connected, and its fundamental group is perfect
- It is path-connected, and the first homology group is trivial
Relation with other properties
Stronger properties
Categories:
- Homotopy-invariant properties of topological spaces
- Properties of topological spaces
- Properties of topological spaces determined by fundamental group
- Properties of topological spaces for an associated group being a perfect group
- Properties of topological spaces determined by first homology group
- Properties of topological spaces for an associated group being a trivial group