Self-maps of simply connected manifolds

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{{beginthm|Example}}
{{beginthm|Example}}
* All oriented closed connected manifolds with non-zero [[simplicial volume]] are not flexible.
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* All oriented closed connected manifolds with non-zero [[simplicial volume]] are not flexible (because the simplicial volume is [[Simplicial volume#Functoriality and elementary examples|functorial]].
* This includes, for instance, oriented closed connected manifolds of non-positive sectional curvature. (More examples and explanations of these facts can be found on the page on [[simplicial volume]].)
* This includes, for instance, oriented closed connected manifolds of non-positive sectional curvature. (More examples and explanations of these facts can be found on the page on [[simplicial volume]].)
{{endthm}}
{{endthm}}
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</wikitex>
</wikitex>
== (Im)Possible strategies ==
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== Solution ==
<wikitex>;
<wikitex>;
* ...
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This problem is (almost) solved; the solution will be presented soon on this page.
</wikitex>
</wikitex>

Revision as of 10:33, 8 June 2010

Contents

1 Question

Let us call an oriented closed connected manifold flexible if it admits a self-map that has non-trivial degree (i.e., degree not equal to 1, 0, or -1).

Question 1.1. Do there exist closed simply connected manifolds (of non-zero dimension) that are not flexible?

Remark 1.2. In the following, for simplicity, we implicitly assume that all manifolds are of non-zero dimension.

2 Examples and partial answers

2.1 Examples of flexible manifolds

  • Of course, all spheres are flexible.
  • All odd-dimensional real projective spaces are flexible; all complex projective spaces are flexible.
  • Products of flexible manifolds with oriented closed connected manifolds are flexible; in particular, tori are flexible.
  • All closed simply connected 3-manifolds are flexible.
  • All closed simply connected 4-manifolds are flexible [Duan&Wang2004, Corollary 2].
  • ...

2.2 Examples of manifolds that are not flexible

Notice that there are many oriented closed connected manifolds that are not flexible.

Example 2.1.

  • All oriented closed connected manifolds with non-zero simplicial volume are not flexible (because the simplicial volume is functorial.
  • This includes, for instance, oriented closed connected manifolds of non-positive sectional curvature. (More examples and explanations of these facts can be found on the page on simplicial volume.)

However, by a theorem of Gromov, the simplicial volume of closed simply connected manifolds is always zero. So the simplicial volume cannot be used to discover closed simply connected manifolds that are not flexible.

3 Solution

This problem is (almost) solved; the solution will be presented soon on this page.

4 Further discussion

...

5 References

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