Add to ORKGTotally real 3-dimensiunal submanifolds of the nearly Kaehler 6-sphere are the main topic of this thesis. Having introduced preliminaries on the theory of complex and almost complex manifolds, the nearly Kaehler structure of S(^6) and the non existence of almost complex. 4-dimensional submanifolds of the 6-sphere [G3], the results of N. Ejiri [Ejl] on orientability, minimality and characterization by means of constant sectional curvature are given. Results concerning the pinching of the sectional curvature in the compact case are coming next (see: [D.O.V.V.1]. [D.V.V2]). These results are obtained by using the integral formulae of .A. Ros [R]. formulae which play a crucial role in global Riemannian geometry. .After a discussion on a new Rie...
summary:In this paper we classify real hypersurfaces with constant totally real bisectional curvatur...
summary:Motivated by the study of CR-submanifolds of codimension~$2$ in~$\bbfC^4$, the authors consi...
summary:Motivated by the study of CR-submanifolds of codimension~$2$ in~$\bbfC^4$, the authors consi...
Let M be a compact 3-dimensional totally real submanifold of the nearly Kaehler 6-sphere. If the Ri...
Let M be a compact 3-dimensional totally real submanifold of the nearly Kaehler 6-sphere. If the Ric...
Abstract. In this paper, we study 3-dimensional totally real submanifolds of S6(1). If this submanif...
AbstractIn this paper, we study Lagrangian submanifolds of the nearly Kähler 6-sphere S6(1). We obta...
Abstract. B. Y. Chen introduced in [3] an important Riemannian invariant for a Riemannian manifold a...
Let M be a totally rea1 3-dimensional submanifold of the nearly Kähler 6-sphere $S6(1)$. Theorems ar...
In this article, we establish sharp relations between the sectional curvature and the shape operator...
Let Pm(C) be an m-dimensional complex projective space with the Fubini-Study metric of constant holo...
Let $\tilde{M}^{m}(c)$ be a complex $m$-dimensional space form of holomorphic sectional curvature $c...
summary:In this paper, we obtain some pinching theorems for totally real minimal submanifolds in com...
summary:In this paper, we obtain some pinching theorems for totally real minimal submanifolds in com...
summary:In this paper we classify real hypersurfaces with constant totally real bisectional curvatur...
summary:In this paper we classify real hypersurfaces with constant totally real bisectional curvatur...
summary:Motivated by the study of CR-submanifolds of codimension~$2$ in~$\bbfC^4$, the authors consi...
summary:Motivated by the study of CR-submanifolds of codimension~$2$ in~$\bbfC^4$, the authors consi...
Let M be a compact 3-dimensional totally real submanifold of the nearly Kaehler 6-sphere. If the Ri...
Let M be a compact 3-dimensional totally real submanifold of the nearly Kaehler 6-sphere. If the Ric...
Abstract. In this paper, we study 3-dimensional totally real submanifolds of S6(1). If this submanif...
AbstractIn this paper, we study Lagrangian submanifolds of the nearly Kähler 6-sphere S6(1). We obta...
Abstract. B. Y. Chen introduced in [3] an important Riemannian invariant for a Riemannian manifold a...
Let M be a totally rea1 3-dimensional submanifold of the nearly Kähler 6-sphere $S6(1)$. Theorems ar...
In this article, we establish sharp relations between the sectional curvature and the shape operator...
Let Pm(C) be an m-dimensional complex projective space with the Fubini-Study metric of constant holo...
Let $\tilde{M}^{m}(c)$ be a complex $m$-dimensional space form of holomorphic sectional curvature $c...
summary:In this paper, we obtain some pinching theorems for totally real minimal submanifolds in com...
summary:In this paper, we obtain some pinching theorems for totally real minimal submanifolds in com...
summary:In this paper we classify real hypersurfaces with constant totally real bisectional curvatur...
summary:In this paper we classify real hypersurfaces with constant totally real bisectional curvatur...
summary:Motivated by the study of CR-submanifolds of codimension~$2$ in~$\bbfC^4$, the authors consi...
summary:Motivated by the study of CR-submanifolds of codimension~$2$ in~$\bbfC^4$, the authors consi...