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We give a classification of minimal homothetical hypersurfaces in an (n+1)-dimensional Euclidean space. In fact, when n ≥ 3, a minimal homothetical hypersurface is a hyperplane, a quadratic cone, a cylinder on a quadratic cone or a cylinder on a helicoid.

On real Kähler Euclidean submanifolds with non-negative Ricci curvature

Luis A. Florit, Wing San Hui, F. Zheng (2005)

Journal of the European Mathematical Society

We show that any real Kähler Euclidean submanifold $f : M^{2 n} \to ℝ^{2 n + p}$ with either non-negative Ricci curvature or non-negative holomorphic sectional curvature has index of relative nullity greater than or equal to $2 n - 2 p$ . Moreover, if equality holds everywhere, then the submanifold must be a product of Euclidean hypersurfaces almost everywhere, and the splitting is global provided that $M^{2 n}$ is complete. In particular, we conclude that the only real Kähler submanifolds $M^{2 n}$ in $ℝ^{3 n}$ that have either positive Ricci curvature or...

On the Components of the Push-out Space with Certain Indices

Yusuf Kaya (2012)

Rendiconti del Seminario Matematico della Università di Padova

On the Gauss map of complete surfaces of constant mean curvature in R3 and R4.

R. Osserman, R. Schoen, D.A. Hoffman (1982)

Commentarii mathematici Helvetici

On the Gauss Map of Surfaces in Rn.

Cun-Jin Sun (1989)

Mathematische Annalen

On the $H p$ -theorem for hypersurfaces

Giovanni Rotondaro (1989)

Commentationes Mathematicae Universitatis Carolinae

On the osculating spaces of submanifolds in Euclidean spaces

Kostadin Trenčevski (2012)

Kragujevac Journal of Mathematics

On the rigidity of certain surfaces in $E^{5}$

Alois Švec (1977)

Czechoslovak Mathematical Journal

On the total (non absolute) curvature of a even dimensional submanifold Xn immersed in Rn+2.

A. M. Naveira (1994)

Revista Matemática de la Universidad Complutense de Madrid

The total curvatures of the submanifolds immersed in the Euclidean space have been studied mainly by Santaló and Chern-Kuiper. In this paper we give geometrical and topological interpretation of the total (non absolute) curvatures of the even dimensional submanifolds immersed in Rn+2. This gives a generalization of two results obtained by Santaló.

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