Sphere bundles and spin (Ex)

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For $<wikitex>; # For $k\geq2$, determine the number of distinct $S^k$-bundles over $S^2$. # Let $E_k\to S^2$ be the complex plane bundle with euler number $k$. Explain how to obtain the sphere-bundle $S(E_k)$ via surgery on $S^3$. # For $m\geq 4$, let $S^1\hookrightarrow M^m$ be a nullhomotopic embedding. For $M$ spin, show that there is more than one possible effect for a surgery on this embedding. Now suppose $M$ is simply connected. For $M$ not spin, show that the effect of a surgery on this embedding ''is'' uniquely determined (difficult!). </wikitex> == References == {{#RefList:}} [[Category:Exercises]]k\geq2$ , determine the number of distinct linear $S^k$ -bundles over $S^2$ .
Let $E_k\to S^2$ be the complex plane bundle with Euler number $k$ . Explain how to obtain the total space of the sphere-bundle $S(E_k)$ via surgery on $S^3$ .

For $m\geq 4$ and $M$ a smooth closed manifold, let $S^1\hookrightarrow M^m$ be a nullhomotopic embedding. For $M$ spin, show that there is more than one possible diffeormorphism type for the outcome of a surgery on this embedding.

Now suppose $M$ is simply connected. For $M$ not spin, show that the outcome of a surgery on this embedding is uniquely determined up to diffeomorphism (difficult!).

For hints, see section in [Gompf&Stipsicz1999] on surgery.

References

[Gompf&Stipsicz1999] R. E. Gompf and A. I. Stipsicz, $4$ -manifolds and Kirby calculus, American Mathematical Society, 1999. MR1707327 (2000h:57038) Zbl 0933.57020

Sphere bundles and spin (Ex)

Latest revision as of 09:24, 1 April 2012

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@@ Line 1: / Line 1: @@
 <wikitex>;
-# For $k\geq2$, determine the number of distinct $S^k$-bundles over $S^2$.
+* For $k\geq2$, determine the number of distinct linear $S^k$-bundles over $S^2$.
+* Let $E_k\to S^2$ be the complex plane bundle with Euler number $k$. Explain how to obtain the total space of the sphere-bundle $S(E_k)$ via surgery on $S^3$.
-# Let $E_k\to S^2$ be the complex plane bundle with euler
+For $m\geq 4$ and $M$ a smooth closed manifold, let $S^1\hookrightarrow M^m$ be a nullhomotopic embedding. For $M$ spin, show that there is more than one possible diffeormorphism type for the outcome of a surgery on this embedding.
-number $k$. Explain how to obtain the sphere-bundle $S(E_k)$ via surgery on
-$S^3$.
-# For $m\geq 4$, let $S^1\hookrightarrow M^m$ be a nullhomotopic embedding. For $M$ spin, show that there is more than one possible effect for a surgery on this embedding.
+Now suppose $M$ is simply connected. For $M$ not spin, show that the outcome of a surgery on this embedding ''is'' uniquely determined up to diffeomorphism (difficult!).
-Now suppose $M$ is simply connected. For $M$ not spin, show that the effect of a surgery on this embedding ''is'' uniquely determined  (difficult!).
+For hints, see section in \cite{Gompf&Stipsicz1999} on surgery.
 </wikitex>
 == References ==
 {{#RefList:}}
 [[Category:Exercises]]
+[[Category:Exercises with solution]]