Isometric Immersions of Constant Mean Curvature and Triviality of the Normal Connection*

Joseph Erbacher

doi:10.1017/S0027763000014719

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In a recent paper [2] Nomizu and Smyth have determined the hypersurfaces Mn of non-negative sectional curvature iso-metrically immersed in the Euclidean space Rn+1 or the sphere Sn+1 with constant mean curvature under the additional assumption that the scalar curvature of Mn is constant. This additional assumption is automatically satisfied if Mn is compact. In this paper we extend these results to codimension p isometric immersions. We determine the n-dimensional submanifolds Mn of non-negative sectional curvature isometrically immersed in the Euclidean Space Rn+P or the sphere Sn+P with constant mean curvature under the additional assumptions that Mn has constant scalar curvature and the curvature tensor of the connection in the normal bundle is zero. By constant mean curvature we mean that the mean curvature normal is paral lel with respect to the connection in the normal bundle. The assumption that Mn has constant scalar curvature is automatically satisfied if Mn is compact. The assumption on the normal connection is automatically sa tisfied if p = 2 and the mean curvature normal is not zero.

Footnotes

This paper is part of the author’s doctoral dissertation written under the direction of Professor K. Nomizu at Brown University. The research was partially supported by the National Science Foundation.

References

[1] Kobayashi, and Nomizu, , Foundations of Differential Geometry, Vol. I-II, John Wiley and Sons Inc., 1963, 1969.Google Scholar

[2] Nomizu, and Smyth, , A formula of Simon’s type and hypersurfaces with constant mean curvature, J. Differential Geometry 3 (1969), 367–377.Google Scholar

[3] Simons, , Minimal Varieties in Riemannian Manifolds, Ann. of Math. 88 (1968), 62–105.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Chen, Bang-Yen and Ludden, Gerald D. 1972. Surfaces with Mean Curvature Vector Parallel in the Normal Bundle. Nagoya Mathematical Journal, Vol. 47, Issue. , p. 161.

Smyth, Brian 1973. Submanifolds of constant mean curvature. Mathematische Annalen, Vol. 205, Issue. 4, p. 265.

Okumura, Masafumi 1973. A pinching problem on the second fundamental tensors and submanifolds of a sphere. Tohoku Mathematical Journal, Vol. 25, Issue. 4,

Ferus, Dirk 1974. Produkt-Zerlegung von Immersionen mit paralleler zweiter Fundamentalform. Mathematische Annalen, Vol. 211, Issue. 1, p. 1.

Yamaguchi, Seiichi and Ikawa, Toshihiko 1975. Remarks on a totally real submanifold. Proceedings of the Japan Academy, Series A, Mathematical Sciences, Vol. 51, Issue. 1,

Henke, Wolfgang 1976. �ber die isometrische Fortsetzbarkeit isometrischer Immersionen der Standard-m-Sph�reS m (?? m + 1 ) in ? m + 2. Mathematische Annalen, Vol. 219, Issue. 3, p. 261.

Yano, Kentaro and Kon, Masahiro 1976. Totally real submanifolds of complex space forms, I. Tohoku Mathematical Journal, Vol. 28, Issue. 2,

Matsuyama, Yoshio 1976. Complex hypersurfaces of $P_{n}(C)\times P_{n}(C)$. Tohoku Mathematical Journal, Vol. 28, Issue. 4,

Lumiste, Yu. G. 1977. Differential geometry of submanifolds. Journal of Soviet Mathematics, Vol. 7, Issue. 4, p. 654.

Sawaki, Sumio and Sekigawa, Kouei 1978. $\sigma$-hypersurfaces in a locally symmetric almost Hermitian manifold. Tohoku Mathematical Journal, Vol. 30, Issue. 4,

Whitt, Lee 1979. Isometric homotopy and codimension-two isometric immersions of the $n$-sphere into Euclidean space. Journal of Differential Geometry, Vol. 14, Issue. 2,

Ejiri, Norio 1983. A generalization of minimal cones. Transactions of the American Mathematical Society, Vol. 276, Issue. 1, p. 347.

Lumiste, Yu. G. and Chakmazyan, A. V. 1983. Normal connection and submanifolds with parallel normal fields in a space of constant curvature. Journal of Soviet Mathematics, Vol. 21, Issue. 2, p. 107.

Aminov, Yu. A. 1984. Embedding problems: Geometric and topological aspects. Journal of Soviet Mathematics, Vol. 25, Issue. 4, p. 1308.

Enomoto, Kazuyuki 1985. Umbilical points on surfaces in RN. Nagoya Mathematical Journal, Vol. 100, Issue. , p. 135.

Matsuyama, Yoshio 1988. Submanifolds with parallel Ricci tensor. Kodai Mathematical Journal, Vol. 11, Issue. 2,

Dajczer, Marcos and Tojeiro, Ruy 1992. On compositions of isometric immersions. Journal of Differential Geometry, Vol. 36, Issue. 1,

Dajczer, Marcos 1992. Rigidity of isometric immersions of higher codimension. Boletim da Sociedade Brasileira de Matemática, Vol. 23, Issue. 1-2, p. 67.

Dajczer, Marcos and Tojeiro, Ruy 1993. Submanifolds of constant sectional curvature with parallel or constant mean curvature. Tohoku Mathematical Journal, Vol. 45, Issue. 1,

Mirzoyan, V. A. 1994. Ric-semisymmetric submanifolds. Journal of Mathematical Sciences, Vol. 70, Issue. 2, p. 1624.

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Isometric Immersions of Constant Mean Curvature and Triviality of the Normal Connection*

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