In this work, we present explicit parameterizations of hypersurfaces parameterized by lines of curvature with prescribed Gauss map and we characterize the hypersurfaces with planar curvature lines. As an application we obtain a classification of isothermic surfaces with respect to the third fundamental form with two planar curvature lines. Also, we present a class of surfaces with one family of planar curvature lines and generalize these results to present classes of hypersurfaces with families of planar curvature lines
Curvature is fundamental to the study of differential geometry. It describes different geometrical a...
In this thesis situated in the area of differential geometry, surfaces and hypersurfaces are studied...
In this paper, the Gaussian curvatures of closed parallel ruled surfaces are calculated. We consider...
In this work, we present explicit parameterizations of hypersurfaces parameterized by lines of curva...
Isothermic parameterizations are synonyms of isothermal curvature line parameterizations, for surfac...
In this article we generalize some classical formulas for curvatures of hypersurfaces in the n-dimen...
We study geodesics on surfaces in the setting of classical differential geometry. We define the curv...
The differential equation of the lines of curvature for immersions of surfaces into ℝ4 is establishe...
The purpose of this paper is to classify surfaces in Euclidean 3- space with constant Gaussian curva...
Abstract. In this paper, we mainly investigate non-developable ruled surface in a 3-dimensional Eucl...
A global statement about a compact surface with constant Gaussian curvature is derived by elementary...
We complete the global classification of spacelike surfaces in the Minkowski three-space with consta...
This book is a posthumous publication of a classic by Prof. Shoshichi Kobayashi, who taught at U.C. ...
We develop a convenient surface theory in E³ in order to apply it to the class of the surfaces invar...
We study the translation surfaces in the pseudo–Galilean space with the condition that one of genera...
Curvature is fundamental to the study of differential geometry. It describes different geometrical a...
In this thesis situated in the area of differential geometry, surfaces and hypersurfaces are studied...
In this paper, the Gaussian curvatures of closed parallel ruled surfaces are calculated. We consider...
In this work, we present explicit parameterizations of hypersurfaces parameterized by lines of curva...
Isothermic parameterizations are synonyms of isothermal curvature line parameterizations, for surfac...
In this article we generalize some classical formulas for curvatures of hypersurfaces in the n-dimen...
We study geodesics on surfaces in the setting of classical differential geometry. We define the curv...
The differential equation of the lines of curvature for immersions of surfaces into ℝ4 is establishe...
The purpose of this paper is to classify surfaces in Euclidean 3- space with constant Gaussian curva...
Abstract. In this paper, we mainly investigate non-developable ruled surface in a 3-dimensional Eucl...
A global statement about a compact surface with constant Gaussian curvature is derived by elementary...
We complete the global classification of spacelike surfaces in the Minkowski three-space with consta...
This book is a posthumous publication of a classic by Prof. Shoshichi Kobayashi, who taught at U.C. ...
We develop a convenient surface theory in E³ in order to apply it to the class of the surfaces invar...
We study the translation surfaces in the pseudo–Galilean space with the condition that one of genera...
Curvature is fundamental to the study of differential geometry. It describes different geometrical a...
In this thesis situated in the area of differential geometry, surfaces and hypersurfaces are studied...
In this paper, the Gaussian curvatures of closed parallel ruled surfaces are calculated. We consider...