Add to ORKGWe derive parametrizations of the Delaunay constant mean curvature surfaces of revolution that follow directly from parametrizations of the conics that generate these surfaces via the corresponding roulette. This uniform treatment exploits the natural geometry of the conic (parabolic, elliptic or hyperbolic) and leads to simple expressions for the mean and Gaussian curvatures of the surfaces as well as the construction of new surfaces.
Abstract. An interesting class of axially symmetric surfaces which generalizes Delaunay’s unduloids ...
Triangulations are among the most important and well-studied objects in computational geometry. A tr...
122 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.In this work, the author stud...
We show how Wente tori and Delaunay surfaces can be used as building blocks to construct new surface...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
Nesta dissertação ao estudamos os artigos The Surfaces of Delaunay, de Eells, James, e Classificatio...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
Equality of zonal areas on a sphere and pseudosphere is extended by elementary geometric methods to ...
Equality of zonal areas on a sphere and pseudosphere is extended by elementary geometric methods to ...
In 1841 Delaunay found a way to construct every constant mean curvature surface of revolution using ...
Delaunay surfaces are investigated by using a moving frame approach. These surfaces correspond to su...
It is a classical result that surfaces made from a constant mean curvature (CMC) H surface by moving...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
Em 1841 Delaunay provou que se rolamos uma cônica sobre uma reta num plano e em seguida rotacionamos...
We provide a method to obtain linear Weingarten surfaces from a given such surface, by imposing a on...
Abstract. An interesting class of axially symmetric surfaces which generalizes Delaunay’s unduloids ...
Triangulations are among the most important and well-studied objects in computational geometry. A tr...
122 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.In this work, the author stud...
We show how Wente tori and Delaunay surfaces can be used as building blocks to construct new surface...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
Nesta dissertação ao estudamos os artigos The Surfaces of Delaunay, de Eells, James, e Classificatio...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
Equality of zonal areas on a sphere and pseudosphere is extended by elementary geometric methods to ...
Equality of zonal areas on a sphere and pseudosphere is extended by elementary geometric methods to ...
In 1841 Delaunay found a way to construct every constant mean curvature surface of revolution using ...
Delaunay surfaces are investigated by using a moving frame approach. These surfaces correspond to su...
It is a classical result that surfaces made from a constant mean curvature (CMC) H surface by moving...
[EN] The aim of this Degree’s Final Dissertation is to review some fundamental facts on CMC surface...
Em 1841 Delaunay provou que se rolamos uma cônica sobre uma reta num plano e em seguida rotacionamos...
We provide a method to obtain linear Weingarten surfaces from a given such surface, by imposing a on...
Abstract. An interesting class of axially symmetric surfaces which generalizes Delaunay’s unduloids ...
Triangulations are among the most important and well-studied objects in computational geometry. A tr...
122 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.In this work, the author stud...