Retract: Difference between revisions
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==Definition== | ==Definition== | ||
===Symbol-free definition=== | |||
A subspace of a topological space is said to be a '''retract''' if it satisfies the following equivalent conditions: | |||
* There is a continuous map on the whole topological space that maps everything to within the subspace, and that is the identity map when restricted to the subspace. | |||
* There is a continuous idempotent map whose image-cum-fixed-point space is precisely the given subspace. | |||
* The inclusion of the subspace in the whole space has a left inverse. | |||
Such a map (satisfying any of the three equivalent conditions) is termed a [[retraction]]. | |||
===Definition with symbols=== | |||
{{fillin}} | |||
==Facts== | ==Facts== | ||
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* In a [[Hausdorff space]], any retract is a [[closed subset]] | * In a [[Hausdorff space]], any retract is a [[closed subset]] | ||
* Many properties of topological spaces are preserved on taking retracts. Examples are properties like being [[simply connected space|simply connected]], [[weakly contractible space|weakly contractible]], [[contractible space|contractible]], or having the [[fixed-point property]]. For a full list of such properties, refer: [[:Category:Retract-hereditary properties of topological spaces]] | * Many properties of topological spaces are preserved on taking retracts. Examples are properties like being [[simply connected space|simply connected]], [[weakly contractible space|weakly contractible]], [[contractible space|contractible]], or having the [[fixed-point property]]. For a full list of such properties, refer: [[:Category:Retract-hereditary properties of topological spaces]] | ||
==References== | |||
===Textbook references=== | |||
* {{booklink|Munkres}}, Page 223, Exercise 4 (definition introduced in exercise) | |||
* {{booklink|Rotman}}, Page 4 (formal definition) | |||
* {{booklink|Spanier}}, Page 28 (formal definition) | |||
Latest revision as of 19:57, 11 May 2008
This article defines a property over pairs of a topological space and a subspace, or equivalently, properties over subspace embeddings (viz, subsets) in topological spaces
Definition
Symbol-free definition
A subspace of a topological space is said to be a retract if it satisfies the following equivalent conditions:
- There is a continuous map on the whole topological space that maps everything to within the subspace, and that is the identity map when restricted to the subspace.
- There is a continuous idempotent map whose image-cum-fixed-point space is precisely the given subspace.
- The inclusion of the subspace in the whole space has a left inverse.
Such a map (satisfying any of the three equivalent conditions) is termed a retraction.
Definition with symbols
Fill this in later
Facts
Clearly the whole space is a retract of itself (the identity map being a retraction) and every one-point subspace is also a retract (the constant map to that one point being the retraction).
Relation with other properties
Stronger properties
Weaker properties
- Homotopically injective subspace
- Homologically injective subspace
- Weak retract
- Neighbourhood retract
Facts
- In a Hausdorff space, any retract is a closed subset
- Many properties of topological spaces are preserved on taking retracts. Examples are properties like being simply connected, weakly contractible, contractible, or having the fixed-point property. For a full list of such properties, refer: Category:Retract-hereditary properties of topological spaces
References
Textbook references
- Topology (2nd edition) by James R. MunkresMore info, Page 223, Exercise 4 (definition introduced in exercise)
- An Introduction to Algebraic Topology (Graduate Texts in Mathematics) by Joseph J. RotmanMore info, Page 4 (formal definition)
- Algebraic Topology by Edwin H. SpanierMore info, Page 28 (formal definition)