Stable classification of 4-manifolds
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Let $P=<g_1, \dots , g_n| r_1,\dots,r_m>$ be the presentation of a group $\pi$. Then we build a $2$-dimensional complex $X(P)$ by taking a wedge of $n$ circles and attaching a $2$-cell via each relation $r_i$. Then we thicken $X(P)$ to a smooth compact manifold with boundary $W(P)$ in $\mathbb R^5$ and consider its boundary denoted by $M(P)$. For details and why this is well defined see [[Thickenings]]. $M(P)$ is a smooth $4$-manifold with fundamental group $\pi$ and we add it to our list: | Let $P=<g_1, \dots , g_n| r_1,\dots,r_m>$ be the presentation of a group $\pi$. Then we build a $2$-dimensional complex $X(P)$ by taking a wedge of $n$ circles and attaching a $2$-cell via each relation $r_i$. Then we thicken $X(P)$ to a smooth compact manifold with boundary $W(P)$ in $\mathbb R^5$ and consider its boundary denoted by $M(P)$. For details and why this is well defined see [[Thickenings]]. $M(P)$ is a smooth $4$-manifold with fundamental group $\pi$ and we add it to our list: | ||
* $M(P)$ | * $M(P)$ | ||
− | Let $\pi$ be a finitely presentable group. Then for each element $\alpha$ in $H_4(K(\pi,1)$ there is a smooth, closed, connected, oriented, non-spinnable manifold $M(\alpha)$ with signature zero, fundamental group $\pi$ and $u_*([M]) = \alpha$. This is proved in several steps by first using the [[B-Bordism#Spectral sequences|Atiyah-Hirzebruch spectral sequence]]) and the fact that the oriented bordism groups are zero in degree $1$, $2$ and $3$: see [[Oriented bordism]] to show that there is a closed, smooth, oriented manifold $M$ together with a map $f: N \to | + | Let $\pi$ be a finitely presentable group. Then for each element $\alpha$ in $H_4(K(\pi,1))$ there is a smooth, closed, connected, oriented, non-spinnable manifold $M(\alpha)$ with signature zero, fundamental group $\pi$ and $u_*([M]) = \alpha$. This is proved in several steps by first using the [[B-Bordism#Spectral sequences|Atiyah-Hirzebruch spectral sequence]]) and the fact that the oriented bordism groups are zero in degree $1$, $2$ and $3$: see [[Oriented bordism]] to show that there is a closed, smooth, oriented manifold $M$ together with a map $f: N \to K(\pi,1)$ with $f_*([M]) = \alpha$ and signature zero. Then by surgeries on $0$- and $1$-dimensional spheres one changes $M$ and $f$ in such a way, that $M$ is connected and $f_*$ is an isomorphism on $\pi_1$ (reference). Finally we form the connected sum with $\mathbb{CP}^2 \oplus (-\mathbb {CP}^2)$ to make $M$ non-spinnable. This manifold is of course not unique but we will see that it is unique up to stable diffeomorphisms and we abbreviate it by |
* $M(\alpha)$ | * $M(\alpha)$ | ||
</wikitex> | </wikitex> |
Revision as of 15:45, 31 March 2011
The user responsible for this page is Matthias Kreck. No other user may edit this page at present. |
This page has not been refereed. The information given here might be incomplete or provisional. |
Contents |
1 Introduction
In this page we report about the stable classification of closed oriented -manifolds. We will begin with a special class of closed oriented -manifolds, namely those, where the universal covering is not spinnable.
2 Construction and examples
We begin with the construction of manifolds which give many stable diffeomorphism types of -manifolds:
- , the Kummer surface.
Let be the presentation of a group . Then we build a -dimensional complex by taking a wedge of circles and attaching a -cell via each relation . Then we thicken to a smooth compact manifold with boundary in and consider its boundary denoted by . For details and why this is well defined see Thickenings. is a smooth -manifold with fundamental group and we add it to our list:
Let be a finitely presentable group. Then for each element in there is a smooth, closed, connected, oriented, non-spinnable manifold with signature zero, fundamental group and . This is proved in several steps by first using the Atiyah-Hirzebruch spectral sequence) and the fact that the oriented bordism groups are zero in degree , and : see Oriented bordism to show that there is a closed, smooth, oriented manifold together with a map with and signature zero. Then by surgeries on - and -dimensional spheres one changes and in such a way, that is connected and is an isomorphism on (reference). Finally we form the connected sum with to make non-spinnable. This manifold is of course not unique but we will see that it is unique up to stable diffeomorphisms and we abbreviate it by
3 Invariants
The following is a complete list of invariants for the stable classification of closed, smooth oriented -manifolds whose universal covering is not spinnable:
- The Euler characteristic
- The signature
- The fundamanetal group
- The image of the fundamental class of .
Here is a classifying map of the universal covering and is the outer automorphism group which acts on the homology of .
4 Classification
Theorem 4.1. Let and be -dimensional compact smooth manifolds with non spinnable universal covering. Then and are stably diffeomorphic if and only if the invariants above agree.
The different stable diffeomorphism classes of manifolds with fundamental group are given by .
The proof of this result is an easy consequence of the general stable classification theorem ([Kreck1999], Stable classification of manifolds). Namely, the normal -type is , see Stable classification of manfifolds. Thus the -bordism group is , which by the Atiyah-Hirzebruch spectral sequence is ismorphic to under the signature and the image of the fundamental class. Now the statement follows from Theorem 3.1 of Stable classification of manifolds.
5 Further discussion
...
6 References
- [Kreck1999] M. Kreck, Surgery and duality, Ann. of Math. (2) 149 (1999), no.3, 707–754. MR1709301 (2001a:57051) Zbl 0935.57039
2 Construction and examples
We begin with the construction of manifolds which give many stable diffeomorphism types of -manifolds:
- , the Kummer surface.
Let be the presentation of a group . Then we build a -dimensional complex by taking a wedge of circles and attaching a -cell via each relation . Then we thicken to a smooth compact manifold with boundary in and consider its boundary denoted by . For details and why this is well defined see Thickenings. is a smooth -manifold with fundamental group and we add it to our list:
Let be a finitely presentable group. Then for each element in there is a smooth, closed, connected, oriented, non-spinnable manifold with signature zero, fundamental group and . This is proved in several steps by first using the Atiyah-Hirzebruch spectral sequence) and the fact that the oriented bordism groups are zero in degree , and : see Oriented bordism to show that there is a closed, smooth, oriented manifold together with a map with and signature zero. Then by surgeries on - and -dimensional spheres one changes and in such a way, that is connected and is an isomorphism on (reference). Finally we form the connected sum with to make non-spinnable. This manifold is of course not unique but we will see that it is unique up to stable diffeomorphisms and we abbreviate it by
3 Invariants
The following is a complete list of invariants for the stable classification of closed, smooth oriented -manifolds whose universal covering is not spinnable:
- The Euler characteristic
- The signature
- The fundamanetal group
- The image of the fundamental class of .
Here is a classifying map of the universal covering and is the outer automorphism group which acts on the homology of .
4 Classification
Theorem 4.1. Let and be -dimensional compact smooth manifolds with non spinnable universal covering. Then and are stably diffeomorphic if and only if the invariants above agree.
The different stable diffeomorphism classes of manifolds with fundamental group are given by .
The proof of this result is an easy consequence of the general stable classification theorem ([Kreck1999], Stable classification of manifolds). Namely, the normal -type is , see Stable classification of manfifolds. Thus the -bordism group is , which by the Atiyah-Hirzebruch spectral sequence is ismorphic to under the signature and the image of the fundamental class. Now the statement follows from Theorem 3.1 of Stable classification of manifolds.
5 Further discussion
...
6 References
- [Kreck1999] M. Kreck, Surgery and duality, Ann. of Math. (2) 149 (1999), no.3, 707–754. MR1709301 (2001a:57051) Zbl 0935.57039
2 Construction and examples
We begin with the construction of manifolds which give many stable diffeomorphism types of -manifolds:
- , the Kummer surface.
Let be the presentation of a group . Then we build a -dimensional complex by taking a wedge of circles and attaching a -cell via each relation . Then we thicken to a smooth compact manifold with boundary in and consider its boundary denoted by . For details and why this is well defined see Thickenings. is a smooth -manifold with fundamental group and we add it to our list:
Let be a finitely presentable group. Then for each element in there is a smooth, closed, connected, oriented, non-spinnable manifold with signature zero, fundamental group and . This is proved in several steps by first using the Atiyah-Hirzebruch spectral sequence) and the fact that the oriented bordism groups are zero in degree , and : see Oriented bordism to show that there is a closed, smooth, oriented manifold together with a map with and signature zero. Then by surgeries on - and -dimensional spheres one changes and in such a way, that is connected and is an isomorphism on (reference). Finally we form the connected sum with to make non-spinnable. This manifold is of course not unique but we will see that it is unique up to stable diffeomorphisms and we abbreviate it by
3 Invariants
The following is a complete list of invariants for the stable classification of closed, smooth oriented -manifolds whose universal covering is not spinnable:
- The Euler characteristic
- The signature
- The fundamanetal group
- The image of the fundamental class of .
Here is a classifying map of the universal covering and is the outer automorphism group which acts on the homology of .
4 Classification
Theorem 4.1. Let and be -dimensional compact smooth manifolds with non spinnable universal covering. Then and are stably diffeomorphic if and only if the invariants above agree.
The different stable diffeomorphism classes of manifolds with fundamental group are given by .
The proof of this result is an easy consequence of the general stable classification theorem ([Kreck1999], Stable classification of manifolds). Namely, the normal -type is , see Stable classification of manfifolds. Thus the -bordism group is , which by the Atiyah-Hirzebruch spectral sequence is ismorphic to under the signature and the image of the fundamental class. Now the statement follows from Theorem 3.1 of Stable classification of manifolds.
5 Further discussion
...
6 References
- [Kreck1999] M. Kreck, Surgery and duality, Ann. of Math. (2) 149 (1999), no.3, 707–754. MR1709301 (2001a:57051) Zbl 0935.57039
2 Construction and examples
We begin with the construction of manifolds which give many stable diffeomorphism types of -manifolds:
- , the Kummer surface.
Let be the presentation of a group . Then we build a -dimensional complex by taking a wedge of circles and attaching a -cell via each relation . Then we thicken to a smooth compact manifold with boundary in and consider its boundary denoted by . For details and why this is well defined see Thickenings. is a smooth -manifold with fundamental group and we add it to our list:
Let be a finitely presentable group. Then for each element in there is a smooth, closed, connected, oriented, non-spinnable manifold with signature zero, fundamental group and . This is proved in several steps by first using the Atiyah-Hirzebruch spectral sequence) and the fact that the oriented bordism groups are zero in degree , and : see Oriented bordism to show that there is a closed, smooth, oriented manifold together with a map with and signature zero. Then by surgeries on - and -dimensional spheres one changes and in such a way, that is connected and is an isomorphism on (reference). Finally we form the connected sum with to make non-spinnable. This manifold is of course not unique but we will see that it is unique up to stable diffeomorphisms and we abbreviate it by
3 Invariants
The following is a complete list of invariants for the stable classification of closed, smooth oriented -manifolds whose universal covering is not spinnable:
- The Euler characteristic
- The signature
- The fundamanetal group
- The image of the fundamental class of .
Here is a classifying map of the universal covering and is the outer automorphism group which acts on the homology of .
4 Classification
Theorem 4.1. Let and be -dimensional compact smooth manifolds with non spinnable universal covering. Then and are stably diffeomorphic if and only if the invariants above agree.
The different stable diffeomorphism classes of manifolds with fundamental group are given by .
The proof of this result is an easy consequence of the general stable classification theorem ([Kreck1999], Stable classification of manifolds). Namely, the normal -type is , see Stable classification of manfifolds. Thus the -bordism group is , which by the Atiyah-Hirzebruch spectral sequence is ismorphic to under the signature and the image of the fundamental class. Now the statement follows from Theorem 3.1 of Stable classification of manifolds.
5 Further discussion
...
6 References
- [Kreck1999] M. Kreck, Surgery and duality, Ann. of Math. (2) 149 (1999), no.3, 707–754. MR1709301 (2001a:57051) Zbl 0935.57039
2 Construction and examples
We begin with the construction of manifolds which give many stable diffeomorphism types of -manifolds:
- , the Kummer surface.
Let be the presentation of a group . Then we build a -dimensional complex by taking a wedge of circles and attaching a -cell via each relation . Then we thicken to a smooth compact manifold with boundary in and consider its boundary denoted by . For details and why this is well defined see Thickenings. is a smooth -manifold with fundamental group and we add it to our list:
Let be a finitely presentable group. Then for each element in there is a smooth, closed, connected, oriented, non-spinnable manifold with signature zero, fundamental group and . This is proved in several steps by first using the Atiyah-Hirzebruch spectral sequence) and the fact that the oriented bordism groups are zero in degree , and : see Oriented bordism to show that there is a closed, smooth, oriented manifold together with a map with and signature zero. Then by surgeries on - and -dimensional spheres one changes and in such a way, that is connected and is an isomorphism on (reference). Finally we form the connected sum with to make non-spinnable. This manifold is of course not unique but we will see that it is unique up to stable diffeomorphisms and we abbreviate it by
3 Invariants
The following is a complete list of invariants for the stable classification of closed, smooth oriented -manifolds whose universal covering is not spinnable:
- The Euler characteristic
- The signature
- The fundamanetal group
- The image of the fundamental class of .
Here is a classifying map of the universal covering and is the outer automorphism group which acts on the homology of .
4 Classification
Theorem 4.1. Let and be -dimensional compact smooth manifolds with non spinnable universal covering. Then and are stably diffeomorphic if and only if the invariants above agree.
The different stable diffeomorphism classes of manifolds with fundamental group are given by .
The proof of this result is an easy consequence of the general stable classification theorem ([Kreck1999], Stable classification of manifolds). Namely, the normal -type is , see Stable classification of manfifolds. Thus the -bordism group is , which by the Atiyah-Hirzebruch spectral sequence is ismorphic to under the signature and the image of the fundamental class. Now the statement follows from Theorem 3.1 of Stable classification of manifolds.
5 Further discussion
...
6 References
- [Kreck1999] M. Kreck, Surgery and duality, Ann. of Math. (2) 149 (1999), no.3, 707–754. MR1709301 (2001a:57051) Zbl 0935.57039