No-retraction theorem: Difference between revisions
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Equivalently, the identity map from <math>S^n</math> to itself is not [[nullhomotopic map|nullhomotopic]], and hence <math>S^n</math> is not contractible. | Equivalently, the identity map from <math>S^n</math> to itself is not [[nullhomotopic map|nullhomotopic]], and hence <math>S^n</math> is not contractible. | ||
== | ==Corollaries== | ||
* [[Complex numbers are algebraically closed]] uses the two-dimensional case of this theorem | * [[Complex numbers are algebraically closed]] uses the two-dimensional case of this theorem | ||
* [[Brouwer fixed-point theorem]] | |||
Revision as of 04:28, 23 May 2007
This article describes a theorem about spheres
Statement
The sphere is not a retract of the disc . In other words, the sphere is not a retract of the disc that it bounds.
Equivalently, the identity map from to itself is not nullhomotopic, and hence is not contractible.
Corollaries
- Complex numbers are algebraically closed uses the two-dimensional case of this theorem
- Brouwer fixed-point theorem