Dupin cyclides are non-spherical algebraic surfaces of degree 4, discovered by the French mathematician Pierre-Charles Dupin at the beginning of the 19th century. A Dupin cyclide has a parametric equation and two implicit equations and circular lines of curvature. It can be defined as the image of a torus, a cone of revolution or a cylinder of revolution by an inversion. A torus has two families of circles: meridians and parallels. There is a third family of circles on a ring torus: Villarceau circles. As the image, by an inversion, of a circle is a circle or a straight line, there are three families of circles onto a Dupin cyclide too. The goal of this paper is to construct, onto a Dupin cyclide, 3D triangles with circular edges: a meridia...
Abstract. This paper focuses on the blending of a plane with surfaces of revolution relying on Dupin...
Dupin cyclides have shown significant promise for applications in geometric modeling. While the math...
This thesis has three main sections. The first describes the notion of linked conics, a pair of plan...
Ring Dupin cyclides are non-spherical algebraic surfaces of degree four that can be defined as the i...
Dupin cyclides are surfaces all lines of curvature of which are circular. We study, from an idiosync...
International audienceA torus contains four families of circles: parallels, meridians and two sets o...
In the 19th century, the French geometer Charles Pierre Dupin discovered a non-spherical surface wit...
A Dupin cyclide is the envelope of a one-parameter family of spheres tangent to three fixed spheres....
Dupin cyclides are algebraic surfaces introduced for the first time in 1822 by the French mathematic...
International audienceDupin cyclides are algebraic surfaces of degree 4 discovered by the French mat...
International audienceA Dupin cyclide can be defined, in two different ways, as the envelope of an o...
Motivated by potential applications in architecture, we study Darboux cyclides. These algebraic surf...
International audienceThe paper deals in the Computer-Aided Design or Computer-Aided Manufacturing d...
We introduce a novel method to define Dupin cyclide blends between quadric primitives. Dupin cyclide...
Abstract. This paper focuses on the blending of a plane with surfaces of revolution relying on Dupin...
Dupin cyclides have shown significant promise for applications in geometric modeling. While the math...
This thesis has three main sections. The first describes the notion of linked conics, a pair of plan...
Ring Dupin cyclides are non-spherical algebraic surfaces of degree four that can be defined as the i...
Dupin cyclides are surfaces all lines of curvature of which are circular. We study, from an idiosync...
International audienceA torus contains four families of circles: parallels, meridians and two sets o...
In the 19th century, the French geometer Charles Pierre Dupin discovered a non-spherical surface wit...
A Dupin cyclide is the envelope of a one-parameter family of spheres tangent to three fixed spheres....
Dupin cyclides are algebraic surfaces introduced for the first time in 1822 by the French mathematic...
International audienceDupin cyclides are algebraic surfaces of degree 4 discovered by the French mat...
International audienceA Dupin cyclide can be defined, in two different ways, as the envelope of an o...
Motivated by potential applications in architecture, we study Darboux cyclides. These algebraic surf...
International audienceThe paper deals in the Computer-Aided Design or Computer-Aided Manufacturing d...
We introduce a novel method to define Dupin cyclide blends between quadric primitives. Dupin cyclide...
Abstract. This paper focuses on the blending of a plane with surfaces of revolution relying on Dupin...
Dupin cyclides have shown significant promise for applications in geometric modeling. While the math...
This thesis has three main sections. The first describes the notion of linked conics, a pair of plan...