Abstract
Let M be a most singular orbit of the isotropy representation of a simple symmetric space. Let \((\nu _i, \Phi _i)\) be an irreducible factor of the normal holonomy representation \((\nu _pM, \Phi (p))\). We prove that there exists a basis of a section \(\Sigma _i\subset \nu _i\) of \(\Phi _i\) such that the corresponding shape operators have rational eigenvalues (this is not in general true for other isotropy orbits). Conversely, this property, if referred to some non-transitive irreducible normal holonomy factor, characterizes the isotropy orbits. We also prove that the definition of a submanifold with constant principal curvatures can be given by using only the traceless shape operator, instead of the shape operator, restricted to a non-transitive (non necessarily irreducible) normal holonomy factor. This article generalizes previous results of the authors that characterized Veronese submanifolds in terms of normal holonomy.
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References
Berndt, J., Console, S., Olmos, C.: Submanifolds and Holonomy, 2nd edn. CRC, Boca Raton (2016)
Console, S., Di Scala, A.J., Olmos, C.: A Berger type theorem for the normal holonomy. Math. Ann. 351, 187–214 (2011)
Console, S., Olmos, C.: Submanifolds of higher rank. Q. J. Math. 48, 309–321 (1997)
Dadok, J.: Polar coordinates induced by actions of compact Lie groups. Trans. Am. Math. Soc. 288, 125–137 (1985)
Di Scala, A.J., Olmos, C.: Submanifolds with curvature normals of constant length and the Gauss map. J. Reine Angew. Math. 574, 79–102 (2004)
Eschenburg, J., Heintze, E.: Polar representations and symmetric spaces. J. Reine Angew. Math. 507, 93–106 (1999)
Heintze, E., Olmos, C.: Normal holonomy groups and s-representations. Indiana Univ. Math. J. 41, 869–874 (1992)
Heintze, E., Palais, R., Terng, C.-L., Thorbergsson, G.: Hyperpolar actions on symmetric spaces. In: Geometry, topology, and physics, Conference Proceedings of Lecture Notes Geometry Topology, IV, International Press, Cambridge, pp. 214–245 (1995)
Olmos, C.: Isoparametric submanifolds and their homogeneous structures. J. Differ. Geom. 38, 225–234 (1993)
Olmos, C.: Submanifolds of higher rank and parallel mean curvature. J. Differ. Geom. 39, 605–627 (1994)
Olmos, C.: Orbits of rank one and parallel mean curvature. Trans. Am. Math. Soc. 347, 2927–2939 (1995)
Olmos, C., Riaño-Riaño, R.: Normal holonomy of orbits and Veronese submanifolds. J. Math. Soc. Jpn. 67, 903–942 (2015)
Palais, R., Terng, C.-L.: Critical Point Theory and Submanifold Geometry, vol. 1353. Springer, Berlin (1988)
Thorbergsson, G.: Isoparametric foliations and their buildings. Ann. Math. 2(133), 429–446 (1991)
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Supported by Famaf-UNC, CIEM-Conicet, Argentina/ Colciencias and Universidad de Los Andes, Colombia.
This research started during the visit of the first author to the Universidad de Los Andes and was essentially finished during the visit of the second author to FaMAF.
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Olmos, C., Riaño-Riaño, R. Normal holonomy and rational properties of the shape operator. manuscripta math. 157, 467–482 (2018). https://doi.org/10.1007/s00229-017-0993-9
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DOI: https://doi.org/10.1007/s00229-017-0993-9