Curvature properties of exotic spheres
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A homotopy sphere of dimension $n$ is an oriented closed smooth | A homotopy sphere of dimension $n$ is an oriented closed smooth | ||
manifold which is homotopy equivalent to the standard sphere $S^n$. A homotopy sphere is called an exotoc sphere if it not diffeoemeorphic to a standard sphere. | manifold which is homotopy equivalent to the standard sphere $S^n$. A homotopy sphere is called an exotoc sphere if it not diffeoemeorphic to a standard sphere. | ||
| − | General information about homotopy spheres (and exotoc spheres) is given on [[Exotic spheres] | + | General information about homotopy spheres (and exotoc spheres) is given on [[Theory|Exotic spheres]]. |
Revision as of 13:58, 7 June 2010
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== Introduction ==
This page is in the construction process!!!
A homotopy sphere of dimension 
is an oriented closed smooth
manifold which is homotopy equivalent to the standard sphere 
. A homotopy sphere is called an exotoc sphere if it not diffeoemeorphic to a standard sphere.
General information about homotopy spheres (and exotoc spheres) is given on Exotic spheres.
