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Isoparametric manifold

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In Riemannian geometry, an isoparametric manifold is a type of (immersed) submanifold of Euclidean space whose normal bundle is flat and whose principal curvatures are constant along any parallel normal vector field. The set of isoparametric manifolds is stable under the mean curvature flow.

Examples

The simplest example of an isoparametric manifold is a sphere in Euclidean space.

Another example is as follows. Suppose that G is a Lie group and G/H is a symmetric space with canonical decomposition

of the Lie algebra g of G into a direct sum (orthogonal with respect to the Killing form) of the Lie algebra h or H with a complementary subspace p. Then a principal orbit of the adjoint representation of H on p is an isoparametric manifold in p. Non principal orbits are examples of the so called submanifolds with principal constant curvatures. Actually, by Thorbergsson's theorem any full and irreducible isoparametric submanifold of codimension > 2 is an s-representation, i.e. an H-orbit as above.

The theory of isoparametric submanifolds is deeply related to the theory of holonomy groups. Actually, any isoparametric submanifold is foliated by the holonomy tubes of a submanifold with constant principal curvatures i.e. a focal submanifold. The paper Submanifolds with constant principal curvatures and normal holonomy groups. International J. Math. 2 (1991),167–175 by Heintze,Olmos and Thorbergsson is a very good introduction to such theory.


References

  • Ferus, D, Karcher, H, and Münzner, HF (1981). "Cliffordalgebren und neue isoparametrische Hyperflächen". Math. Z. 177 (4): 479–502. doi:10.1007/BF01219082.{{cite journal}}: CS1 maint: multiple names: authors list (link)
  • Palais, RS and Terng, C-L (1987). "A general theory of canonical forms". Transactions of the American Mathematical Society. 300 (2). Transactions of the American Mathematical Society, Vol. 300, No. 2: 771–789. doi:10.2307/2000369. JSTOR 2000369.{{cite journal}}: CS1 maint: multiple names: authors list (link)
  • Terng, C-L (1985). "Isoparametric submanifolds and their Coxeter groups". Journal of Differential Geometry. 21: 79–107.

See also