We study helix surfaces with parallel mean curvature vector in Euclidean space from a local point of view. Our main result says that they are either part of a cylinder of revolution or a plane. One way to prove this is with the generalization we found about the Laplacian of a support function of a hypersurface. This allows us to study the constant mean curvature surfaces in space forms which have constant angle with respect to a closed and conformal vector field. The result we find says that these surfaces are totally umbilic
The structure of helix is a significant field in the differential geometry studies, and it is profou...
summary:We give an expository account of a Weierstrass type representation of the non-zero constant ...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
We study helix surfaces with parallel mean curvature vector in Euclidean space from a local point of...
We characterize helix surfaces (constant angle surfaces) in the special linear group SL(2,R). In par...
We investigate minimal helix submanifolds of any dimension and codimension immersed in Euclidean spa...
In this study, we define two types of mappings that preserve the constant angle between the tangent ...
This paper deals with the surfaces of constant mean curvature in the Euclidean space. The first par...
In this work, we study helix spacelike and timelike surfaces in the Lorentzian Berger sphere S3ε, th...
We study surfaces in R4 whose tangent spaces have constant principal angles with respect to a plane....
AbstractWe ask when a constant mean curvature n-submanifold foliated by spheres in one of the Euclid...
In this paper, we give a definition of harmonic curvature functions in terms of $V_{n}$ and we defin...
This thesis is concerned with the problem of constructing surfaces of constant mean curvature. More ...
We characterize helix surfaces in the Berger sphere, that is surfaces which form a constant angle wi...
It is a classical result that surfaces made from a constant mean curvature (CMC) H surface by moving...
The structure of helix is a significant field in the differential geometry studies, and it is profou...
summary:We give an expository account of a Weierstrass type representation of the non-zero constant ...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
We study helix surfaces with parallel mean curvature vector in Euclidean space from a local point of...
We characterize helix surfaces (constant angle surfaces) in the special linear group SL(2,R). In par...
We investigate minimal helix submanifolds of any dimension and codimension immersed in Euclidean spa...
In this study, we define two types of mappings that preserve the constant angle between the tangent ...
This paper deals with the surfaces of constant mean curvature in the Euclidean space. The first par...
In this work, we study helix spacelike and timelike surfaces in the Lorentzian Berger sphere S3ε, th...
We study surfaces in R4 whose tangent spaces have constant principal angles with respect to a plane....
AbstractWe ask when a constant mean curvature n-submanifold foliated by spheres in one of the Euclid...
In this paper, we give a definition of harmonic curvature functions in terms of $V_{n}$ and we defin...
This thesis is concerned with the problem of constructing surfaces of constant mean curvature. More ...
We characterize helix surfaces in the Berger sphere, that is surfaces which form a constant angle wi...
It is a classical result that surfaces made from a constant mean curvature (CMC) H surface by moving...
The structure of helix is a significant field in the differential geometry studies, and it is profou...
summary:We give an expository account of a Weierstrass type representation of the non-zero constant ...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...