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Kervaire manifold

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In mathematics, specifically in differential topology, a Kervaire manifold $K^{4n+2}$ is a piecewise-linear manifold of dimension $4n+2$ constructed by Michel Kervaire (1960) by plumbing together the tangent bundles of two $(2n+1)$ -spheres, and then gluing a ball to the result. In 10 dimensions this gives a piecewise-linear manifold with no smooth structure.

See also

Exotic sphere

References

Kervaire, Michel (1960), "A manifold which does not admit any differentiable structure", Commentarii Mathematici Helvetici, 34: 257–270, doi:10.1007/BF02565940, MR 0139172, S2CID 120977898
Shtan'ko, M.A. (2001) , "Kervaire invariant", Encyclopedia of Mathematics, EMS Press
Shtan'ko, M.A. (2001) , "Dendritic manifold", Encyclopedia of Mathematics, EMS Press

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