Chiral manifold
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− | A closed, connected, orientable manifold in one of the categories [[Wikipedia:Topological_manifold|TOP]], [[Wikipedia:Piecewise_linear_manifold|PL]] or [[Wikipedia:Smooth_manifold|DIFF]] is called ''chiral'' if it does not admit an orientation-reversing automorphism in the respective category and ''amphicheiral'' if it does. For the sake of clarity, the category should be indicated by adverbs: e. | + | A closed, connected, orientable manifold in one of the categories [[Wikipedia:Topological_manifold|TOP]], [[Wikipedia:Piecewise_linear_manifold|PL]] or [[Wikipedia:Smooth_manifold|DIFF]] is called ''chiral'' if it does not admit an orientation-reversing automorphism in the respective category and ''amphicheiral'' if it does. For the sake of clarity, the category should be indicated by adverbs: e. g. a ''topologically chiral'' manifold does not admit an orientation-reversing self-homeomorphism, whereas a ''smoothly amphicheiral'' manifold is a differentiable manifold which admits an orientation-reversing self-diffeomorphism. |
− | This definition can be extended by the notion of ''homotopical chirality/amphicheirality'' when homotopy self-equivalences are considered. Chiral manifolds in the strongest sense do not admit self-maps of degree | + | This definition can be extended by the notion of ''homotopical chirality/amphicheirality'' when homotopy self-equivalences are considered. Chiral manifolds in the strongest sense do not admit self-maps of degree −1; they are called ''strongly chiral'' and ''weakly amphicheiral'' in the opposite case. |
− | The terminology ''amphicheiral'' was introduced by Tait {{cite|Tait1876}} (p.160) in his work on knots. The words ''amphicheiral'', ''amphichiral'' and ''achiral'' are synonyms. ''Amphicheiral'' is most frequently used in [http://www.ams.org/mathscinet/ MathSciNet]. | + | == Terminology == |
+ | The terminology ''amphicheiral'' was introduced by Tait {{cite|Tait1876}} (p.160) in his work on knots. | ||
+ | |||
+ | The words ''amphicheiral'', ''amphichiral'' and ''achiral'' are synonyms. ''Amphicheiral'' is most frequently used in [http://www.ams.org/mathscinet/ MathSciNet]. | ||
== References == | == References == | ||
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* {{Müllner2009}} | * {{Müllner2009}} | ||
* {{Tait1876}} | * {{Tait1876}} | ||
− | + | == External links == | |
− | [[Category: | + | * The Wikipedia page about [[Wikipedia:Chirality_(mathematics)|chirality in mathematics]]. |
+ | [[Category:Definitions]] |
Latest revision as of 11:48, 13 June 2013
A closed, connected, orientable manifold in one of the categories TOP, PL or DIFF is called chiral if it does not admit an orientation-reversing automorphism in the respective category and amphicheiral if it does. For the sake of clarity, the category should be indicated by adverbs: e. g. a topologically chiral manifold does not admit an orientation-reversing self-homeomorphism, whereas a smoothly amphicheiral manifold is a differentiable manifold which admits an orientation-reversing self-diffeomorphism.
This definition can be extended by the notion of homotopical chirality/amphicheirality when homotopy self-equivalences are considered. Chiral manifolds in the strongest sense do not admit self-maps of degree −1; they are called strongly chiral and weakly amphicheiral in the opposite case.
1 Terminology
The terminology amphicheiral was introduced by Tait [Tait1876] (p.160) in his work on knots.
The words amphicheiral, amphichiral and achiral are synonyms. Amphicheiral is most frequently used in MathSciNet.
2 References
- Daniel Müllner, Orientation reversal of manifolds, Algebr. Geom. Topol. 9 (2009), no. 4, 2361–2390.
- P.G.Tait, On knots I., Trans. Roy. Soc. Edin. 28 (1876), 145–190.
3 External links
- The Wikipedia page about chirality in mathematics.