Inertia group II (Ex)
From Manifold Atlas
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− | Let $M$ be a closed smooth oriented $n$-manifold. The ''homotopy inertia group of $M$'', $I_H(M), | + | Let $M$ be a closed smooth oriented $n$-manifold. The ''homotopy inertia group of $M$'', $I_H(M)$, |
is the subgroup of homotopy $n$-spheres $\Theta_n$ defined by | is the subgroup of homotopy $n$-spheres $\Theta_n$ defined by | ||
$$ I_H(M) : = \{ \Sigma | \exists f \colon \Sigma \sharp M \cong M, f \simeq {\rm Id}_M \},$$ | $$ I_H(M) : = \{ \Sigma | \exists f \colon \Sigma \sharp M \cong M, f \simeq {\rm Id}_M \},$$ | ||
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{{#RefList:}} | {{#RefList:}} | ||
[[Category:Exercises]] | [[Category:Exercises]] | ||
− | [[Category:Exercises | + | [[Category:Exercises with solution]] |
Latest revision as of 18:35, 29 August 2013
Let be a closed smooth oriented -manifold. The homotopy inertia group of , , is the subgroup of homotopy -spheres defined by
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Tex syntax errorwe regard and as the same topological space (with different smooth structures).
Exercise 0.1.
- Show that if and only if
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is equivalent toTex syntax error
in . - Given that , determine .
- Assuming that , deduce that admits a self-homotopy equivalence which is not homotopic to a diffeomorphism.