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Non-immersibility of a space form as a totally umbilical hypersurface

Published online by Cambridge University Press:  14 November 2011

Masafumi Okumura
Affiliation:
Department of Mathematics, Saitama University, Urawa, Japan
Hiroshi Takahashi
Affiliation:
Department of Mathematics, Saitama University, Urawa, Japan

Synopsis

Suppose that a space form is immersed into another Riemannian manifold as a totally umbilical hypersurface with constant mean curvature. Then, in the ambient manifold, the lengthof the curvature tensor, that of the Ricci tensor and the scalar curvature must satisfy an inequality. In this paper the authors proved the inequality. As applications of the inequality, some immersibility problems are investigated. For example, it is proved that if a space form is immersed in an Einstein manifold as a totally umbilical hypersurface, then the Einstein manifold has constant sectional curvature along the hypersurface. Moreover, it is proved that a space form cannot be immersed into some Kaehlerian manifolds as a totally umbilical hypersurface with constant mean curvature.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 1988

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References

1Cartan, E.. Legon sur la géométrie des espaces de Riemann (Paris: Gauthier-Villars, 1946).Google Scholar
2Leung, D. S. and Nomizu, K.. The axiom of spheres in Riemannian geometry. J. Differential Geom. 5(1971), 487489.CrossRefGoogle Scholar
3Schouten, J. A.. Der Ricci-Kalkül (Berlin: Springer, 1924).Google Scholar
4Tachibana, S.. On the Bochner curvature tensor. Natur. Sci. Rep. Ochanomizu Univ. 18 (1967), 1519.Google Scholar
5Tashiro, Y. and Tachibana, S.. On Fubinian and C-Fubinian manifolds. Kodai Math. Sem Rep 15 (1963), 176183.CrossRefGoogle Scholar
6Yano, K. and Bochner, S.. Curvature and Betti numbers. Ann. of Math. Stud. 32 (1953).Google Scholar
7Yano, K.. Differential geometry on complex and almost complex spaces (New York: Pergamon Press, 1965).Google Scholar