Milstein method: Difference between revisions
en>Brown motion Added an intuitive proof of why the Milstein approximation works |
en>Gareth Jones remove unnecessary comma |
||
Line 1: | Line 1: | ||
In [[topology]], a branch of mathematics, an '''aspherical space''' is a [[topological space]] with all [[homotopy groups]] π<sub>''n''</sub>(''X'') equal to 0 when ''n''>1. | |||
If one works with [[CW complex]]es, one can reformulate this condition: an aspherical CW complex is a CW complex whose [[universal cover]] is [[contractible]]. Indeed, contractibility of a universal cover is the same, by [[Whitehead's theorem]], as asphericality of it. And it is an application of the [[exact sequence of a fibration]] that higher homotopy groups of a space and its universal cover are same. (By the same argument, if ''E'' is a [[Connected space|path-connected space]] and ''p'': ''E'' → ''B'' is any [[covering space|covering map]], then ''E'' is aspherical if and only if ''B'' is aspherical.) | |||
Aspherical spaces are, directly from the definitions, [[Eilenberg-MacLane space]]s. Also directly from the definitions, aspherical spaces are [[classifying space]]s of their fundamental groups. | |||
==Examples== | |||
* Using the second of above definitions we easily see that all orientable compact [[surface]]s of genus greater than 0 are aspherical (as they have either the Euclidean plane or the hyperbolic plane as a universal cover). | |||
* It follows that all non-orientable surfaces, except the real [[projective plane]], are aspherical as well, as they can be covered by an orientable surface genus 1 or higher. | |||
* Similarly, a [[product topology|product]] of any number of [[circle]]s is aspherical. | |||
* Any [[hyperbolic 3-manifold]] is, by definition, covered by the hyperbolic 3-space '''H'''<sup>3</sup>, hence aspherical. | |||
* Let ''X'' = ''G''/''K'' be a [[Riemannian symmetric space]] of negative type, and '''Γ''' be a [[lattice (mathematics)|lattice]]{{dn|date=May 2012}} in ''G'' that acts freely on ''X''. Then the [[locally symmetric space]] <math>\Gamma\backslash G/K</math> is aspherical. | |||
* The [[Bruhat-Tits building]] of a simple [[algebraic group]] over a field with a [[discrete valuation]] is aspherical. | |||
* The complement of a [[knot (mathematics)|knot]] in '''S'''<sup>3</sup> is aspherical, by the [[sphere theorem (3-manifolds)|sphere theorem]] | |||
* Metric spaces with nonpositive curvature in the sense of [[Aleksandr Danilovich Aleksandrov|Aleksandrov]] (locally [[CAT(0) space]]s) are aspherical. In the case of [[Riemannian manifold]]s, this follows from the [[Cartan–Hadamard theorem]], which has been generalized to [[geodesic metric space]]s by [[Mikhail Gromov (mathematician)|Gromov]] and Ballmann. This class of aspherical spaces subsumes all the previously given examples. | |||
* Any [[nilmanifold]] is aspherical. | |||
==Symplectically aspherical manifolds== | |||
If one deals with [[symplectic manifold]]s, the meaning of "aspherical" is a little bit different. Specifically, we say that a symplectic manifold (M,ω) is symplectically aspherical if and only if | |||
:<math>\int_{S^2}f^*\omega=\langle c_1(TM),f_*[S^2]\rangle=0</math> | |||
for every continuous mapping | |||
:<math>f\colon S^2 \to M,</math> | |||
where <math>c_1(TM)</math> denotes the first [[Chern class]] of an [[almost complex manifold|almost complex structure]] which is compatible with ω. | |||
By [[Stokes' theorem]], we see that symplectic manifolds which are aspherical are also symplectically aspherical manifolds. However, there do exist symplectically aspherical manifolds which are not aspherical spaces.<ref>Robert E. Gompf, ''Symplectically aspherical manifolds with nontrivial π<sub>2</sub>'', Math. Res. Lett. 5 (1998), no. 5, 599–603. {{MR|1666848}}</ref> | |||
Some references<ref>Jarek Kedra, [[Yuli Rudyak]], and Aleksey Tralle, ''Symplectically aspherical manifolds'', J. Fixed Point Theory Appl. 3 (2008), no. 1, 1–21. {{MR|2402905}}</ref> drop the requirement on ''c''<sub>1</sub> in their definition of "symplectically aspherical." However, it is more common for symplectic manifolds satisfying only this weaker condition to be called "weakly exact." | |||
==See also== | |||
*[[Acyclic space]] | |||
*[[Essential manifold]] | |||
==Notes== | |||
<references/> | |||
==References== | |||
* Bridson, Martin R.; [[André Haefliger|Haefliger, André]], ''Metric spaces of non-positive curvature''. Grundlehren der Mathematischen Wissenschaften, 319. Springer-Verlag, Berlin, 1999. xxii+643 pp. ISBN 3-540-64324-9 {{MR|1744486}} | |||
== External links == | |||
* [http://www.map.him.uni-bonn.de/index.php/Aspherical_manifolds Aspherical manifolds] on the Manifold Atlas. | |||
[[Category:Algebraic topology]] | |||
[[Category:Homology theory]] | |||
[[Category:Homotopy theory]] |
Latest revision as of 22:39, 11 June 2013
In topology, a branch of mathematics, an aspherical space is a topological space with all homotopy groups πn(X) equal to 0 when n>1.
If one works with CW complexes, one can reformulate this condition: an aspherical CW complex is a CW complex whose universal cover is contractible. Indeed, contractibility of a universal cover is the same, by Whitehead's theorem, as asphericality of it. And it is an application of the exact sequence of a fibration that higher homotopy groups of a space and its universal cover are same. (By the same argument, if E is a path-connected space and p: E → B is any covering map, then E is aspherical if and only if B is aspherical.)
Aspherical spaces are, directly from the definitions, Eilenberg-MacLane spaces. Also directly from the definitions, aspherical spaces are classifying spaces of their fundamental groups.
Examples
- Using the second of above definitions we easily see that all orientable compact surfaces of genus greater than 0 are aspherical (as they have either the Euclidean plane or the hyperbolic plane as a universal cover).
- It follows that all non-orientable surfaces, except the real projective plane, are aspherical as well, as they can be covered by an orientable surface genus 1 or higher.
- Any hyperbolic 3-manifold is, by definition, covered by the hyperbolic 3-space H3, hence aspherical.
- Let X = G/K be a Riemannian symmetric space of negative type, and Γ be a latticeTemplate:Dn in G that acts freely on X. Then the locally symmetric space is aspherical.
- The Bruhat-Tits building of a simple algebraic group over a field with a discrete valuation is aspherical.
- The complement of a knot in S3 is aspherical, by the sphere theorem
- Metric spaces with nonpositive curvature in the sense of Aleksandrov (locally CAT(0) spaces) are aspherical. In the case of Riemannian manifolds, this follows from the Cartan–Hadamard theorem, which has been generalized to geodesic metric spaces by Gromov and Ballmann. This class of aspherical spaces subsumes all the previously given examples.
- Any nilmanifold is aspherical.
Symplectically aspherical manifolds
If one deals with symplectic manifolds, the meaning of "aspherical" is a little bit different. Specifically, we say that a symplectic manifold (M,ω) is symplectically aspherical if and only if
for every continuous mapping
where denotes the first Chern class of an almost complex structure which is compatible with ω.
By Stokes' theorem, we see that symplectic manifolds which are aspherical are also symplectically aspherical manifolds. However, there do exist symplectically aspherical manifolds which are not aspherical spaces.[1]
Some references[2] drop the requirement on c1 in their definition of "symplectically aspherical." However, it is more common for symplectic manifolds satisfying only this weaker condition to be called "weakly exact."
See also
Notes
- ↑ Robert E. Gompf, Symplectically aspherical manifolds with nontrivial π2, Math. Res. Lett. 5 (1998), no. 5, 599–603. Template:MR
- ↑ Jarek Kedra, Yuli Rudyak, and Aleksey Tralle, Symplectically aspherical manifolds, J. Fixed Point Theory Appl. 3 (2008), no. 1, 1–21. Template:MR
References
- Bridson, Martin R.; Haefliger, André, Metric spaces of non-positive curvature. Grundlehren der Mathematischen Wissenschaften, 319. Springer-Verlag, Berlin, 1999. xxii+643 pp. ISBN 3-540-64324-9 Template:MR
External links
- Aspherical manifolds on the Manifold Atlas.