Freudenthal suspension theorem: Difference between revisions
Included proof of theorem |
{{redirect|Suspension theorem|the theorem in homology|Excision theorem#Suspension theorem for homology}} |
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{{short description|Establishes the concept of stabilization of homotopy groups}} |
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{{redirect|Suspension theorem|the theorem in homology|Excision theorem#Suspension theorem for homology}} |
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{{No footnotes|date=June 2020}} |
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In [[mathematics]], and specifically in the field of [[homotopy theory]], the '''Freudenthal suspension theorem''' is the fundamental result leading to the concept of stabilization of [[homotopy group]]s and ultimately to [[stable homotopy theory]]. It explains the behavior of simultaneously taking [[suspension (topology)|suspension]]s and increasing the index of the homotopy groups of the space in question. It was proved in 1937 by [[Hans Freudenthal]]. |
In [[mathematics]], and specifically in the field of [[homotopy theory]], the '''Freudenthal suspension theorem''' is the fundamental result leading to the concept of stabilization of [[homotopy group]]s and ultimately to [[stable homotopy theory]]. It explains the behavior of simultaneously taking [[suspension (topology)|suspension]]s and increasing the index of the homotopy groups of the space in question. It was proved in 1937 by [[Hans Freudenthal]]. |
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Let ''X'' be an [[n-connected|''n''-connected]] [[pointed space]] (a pointed [[CW-complex]] or pointed [[simplicial set]]). The map |
Let ''X'' be an [[n-connected|''n''-connected]] [[pointed space]] (a pointed [[CW-complex]] or pointed [[simplicial set]]). The map |
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:<math>X \to \Omega(\Sigma X)</math> |
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induces a map |
induces a map |
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:<math>\pi_k(X) \to \pi_k(\Omega(\Sigma X))</math> |
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:π<sub>''k''</sub>(''X'') → π<sub>''k''</sub>(Ω(''X'' ∧ ''S''<sup>1</sup>)) |
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on homotopy groups, where Ω denotes the [[loop functor]] and |
on homotopy groups, where Ω denotes the [[loop functor]] and Σ denotes the [[Suspension (topology)|reduced suspension functor]]. The suspension theorem then states that the induced map on homotopy groups is an [[isomorphism]] if ''k'' ≤ 2''n'' and an [[epimorphism]] if ''k'' = 2''n'' + 1. |
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A basic result on loop spaces gives the relation |
A basic result on loop spaces gives the relation |
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:<math>\pi_k(\Omega (\Sigma X)) \cong \pi_{k+1}(\Sigma X)</math> |
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:π<sub>''k''</sub>(Ω(''X'' ∧ ''S''<sup>1</sup>)) ≅ π<sub>''k''+1</sub>(''X'' ∧ ''S''<sup>1</sup>) |
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so the theorem could otherwise be stated in terms of the map |
so the theorem could otherwise be stated in terms of the map |
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:<math>\pi_k(X) \to \pi_{k+1}(\Sigma X),</math> |
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:π<sub>''k''</sub>(''X'') → π<sub>''k''+1</sub>(''X'' ∧ ''S''<sup>1</sup>), |
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with the small caveat that in this case one must be careful with the indexing. |
with the small caveat that in this case one must be careful with the indexing. |
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===Proof=== |
===Proof=== |
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As mentioned above, the Freudenthal suspension theorem follows quickly from homotopy excision; this proof is in terms of the natural map <math>\pi_k(X)\to\pi_{k+1}(\Sigma X)</math> |
As mentioned above, the Freudenthal suspension theorem follows quickly from [[homotopy excision theorem|homotopy excision]]; this proof is in terms of the natural map <math>\pi_k(X)\to\pi_{k+1}(\Sigma X)</math>. If a space <math>X</math> is <math>n</math>-connected, then the pair of spaces <math>(CX,X)</math> is <math>(n+1)</math>-connected, where <math>CX</math> is the [[Cone (topology)|reduced cone]] over <math>X</math>; this follows from the [[Homotopy group#Relative homotopy groups|relative homotopy long exact sequence]]. We can decompose <math>\Sigma X</math> as two copies of <math>CX</math>, say <math>(CX)_+, (CX)_-</math>, whose intersection is <math>X</math>. Then, homotopy excision says the inclusion map: |
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:<math>((CX)_+, X)\subset (\Sigma X,(CX)_-)</math> |
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⚫ | |||
induces isomorphisms on <math>\pi_i, i < 2n+2</math> and a surjection on <math>\pi_{2n+2}</math>. From the same relative long exact sequence, <math>\pi_i(X)=\pi_{i+1}(CX,X),</math> and since in addition cones are contractible, |
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⚫ | |||
:<math>\pi_i(\Sigma X,(CX)_-)=\pi_i(\Sigma X).</math> |
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Let ''S''<sup>''n''</sup> denote the ''n''-sphere and note that it is (''n'' − 1)-connected so that the groups π<sub>''n''+''k''</sub>(''S''<sup>''n''</sup>) stabilize for |
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Putting this all together, we get |
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:''n'' ≥ ''k'' + 2 |
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:<math>\pi_i(X)=\pi_{i+1}((CX)_+,X)=\pi_{i+1}((\Sigma X,(CX)_-)=\pi_{i+1}(\Sigma X)</math> |
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⚫ | |||
⚫ | |||
by the Freudenthal theorem. These groups represent the ''k''th stable [[homotopy groups of spheres|homotopy group of spheres]]. |
Let ''S<sup>n</sup>'' denote the ''n''-sphere and note that it is (''n'' − 1)-connected so that the groups <math>\pi_{n+k}(S^n)</math> stabilize for <math>n \geqslant k+2</math> by the Freudenthal theorem. These groups represent the ''k''th stable [[homotopy groups of spheres|homotopy group of spheres]]. |
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===Corollary 2=== |
===Corollary 2=== |
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More generally, for fixed ''k'' ≥ |
More generally, for fixed ''k'' ≥ 1, ''k'' ≤ 2''n'' for sufficiently large ''n'', so that any ''n''-connected space ''X'' will have corresponding stabilized homotopy groups. These groups are actually the homotopy groups of an object corresponding to ''X'' in the [[stable homotopy category]]. |
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==References== |
==References== |
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*{{citation|doi=10.2307/1969855|first=G. W.|last=Whitehead|authorlink=George W. Whitehead|title=On the Freudenthal Theorems|journal=Annals of Mathematics|volume=57|issue=2|year=1953|pages=209–228|jstor=1969855|mr=0055683}}. |
*{{citation|doi=10.2307/1969855|first=G. W.|last=Whitehead|authorlink=George W. Whitehead|title=On the Freudenthal Theorems|journal=Annals of Mathematics|volume=57|issue=2|year=1953|pages=209–228|jstor=1969855|mr=0055683}}. |
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[[Category: |
[[Category:Theorems in homotopy theory]] |
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[[Category:Theorems in algebraic topology]] |
Latest revision as of 02:42, 28 September 2024
This article includes a list of references, related reading, or external links, but its sources remain unclear because it lacks inline citations. (June 2020) |
In mathematics, and specifically in the field of homotopy theory, the Freudenthal suspension theorem is the fundamental result leading to the concept of stabilization of homotopy groups and ultimately to stable homotopy theory. It explains the behavior of simultaneously taking suspensions and increasing the index of the homotopy groups of the space in question. It was proved in 1937 by Hans Freudenthal.
The theorem is a corollary of the homotopy excision theorem.
Statement of the theorem
[edit]Let X be an n-connected pointed space (a pointed CW-complex or pointed simplicial set). The map
induces a map
on homotopy groups, where Ω denotes the loop functor and Σ denotes the reduced suspension functor. The suspension theorem then states that the induced map on homotopy groups is an isomorphism if k ≤ 2n and an epimorphism if k = 2n + 1.
A basic result on loop spaces gives the relation
so the theorem could otherwise be stated in terms of the map
with the small caveat that in this case one must be careful with the indexing.
Proof
[edit]As mentioned above, the Freudenthal suspension theorem follows quickly from homotopy excision; this proof is in terms of the natural map . If a space is -connected, then the pair of spaces is -connected, where is the reduced cone over ; this follows from the relative homotopy long exact sequence. We can decompose as two copies of , say , whose intersection is . Then, homotopy excision says the inclusion map:
induces isomorphisms on and a surjection on . From the same relative long exact sequence, and since in addition cones are contractible,
Putting this all together, we get
for , i.e. , as claimed above; for the left and right maps are isomorphisms, regardless of how connected is, and the middle one is a surjection by excision, so the composition is a surjection as claimed.
Corollary 1
[edit]Let Sn denote the n-sphere and note that it is (n − 1)-connected so that the groups stabilize for by the Freudenthal theorem. These groups represent the kth stable homotopy group of spheres.
Corollary 2
[edit]More generally, for fixed k ≥ 1, k ≤ 2n for sufficiently large n, so that any n-connected space X will have corresponding stabilized homotopy groups. These groups are actually the homotopy groups of an object corresponding to X in the stable homotopy category.
References
[edit]- Freudenthal, H. (1938), "Über die Klassen der Sphärenabbildungen. I. Große Dimensionen", Compositio Mathematica, 5: 299–314.
- Goerss, P. G.; Jardine, J. F. (1999), Simplicial Homotopy Theory, Progress in Mathematics, vol. 174, Basel-Boston-Berlin: Birkhäuser.
- Hatcher, Allen (2002), Algebraic Topology, Cambridge: Cambridge University Press, ISBN 0-521-79540-0.
- Whitehead, G. W. (1953), "On the Freudenthal Theorems", Annals of Mathematics, 57 (2): 209–228, doi:10.2307/1969855, JSTOR 1969855, MR 0055683.