Search results for "Dupin cyclides"

showing 3 items of 3 documents

Blending pieces of Dupin cyclides for 3D modeling and reconstruction : study in the space of spheres

2013

The thesis deals with the blending of canal surfaces in geometric modeling using pieces of Dupin Cyclides. We try to solve a problem of reconstructing real parts manufactured and controlled by the CEA of Valduc. Using the space of spheres in which we can manipulate both points, spheres and canal surfaces, we simplify some problems. This space is represented by a 4-dimensional quadric in a 5-dimensional space, equipped with the Lorentz form, it is the Lorentz space. In the space of spheres, problems of blending canal surfaces by pieces of Dupin cyclides are simplified in linear problems. We give algorithms to make such blends using the space of spheres and after we come back to 3 dimensions …

Cyclides de Dupin[MATH.MATH-GM]Mathematics [math]/General Mathematics [math.GM]BlendsDupin cyclidesJoins[ MATH.MATH-GM ] Mathematics [math]/General Mathematics [math.GM]JointuresSpace of spheresRecollements[MATH.MATH-GM] Mathematics [math]/General Mathematics [math.GM]Canal surfacesSurfaces canalEspace de sphères
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Foliations of $\mathbb{S}^3$ by Cyclides

2018

Throughout the last 2–3 decades, there has been great interest in the extrinsic geometry of foliated Riemannian manifolds (see [2], [4] and [22]). ¶One approach is to build examples of foliations with reasonably simple singularities with leaves admitting some very restrictive geometric condition. For example (see [22], [23] and [17]), consider in particular foliations of $\mathbb{S}^{3}$ by totally geodesic or totally umbilical leaves with isolated singularities. ¶The article [14] provides families of foliations of $\mathbb{S}^{3}$ by Dupin cyclides with only one smooth curve of singularities. Quadrics and other families of cyclides like Darboux cyclides provide other examples. These foliat…

[ MATH ] Mathematics [math]Pure mathematics65D17Dupin cyclides53A30foliations of $\mathbb{S}^{3}$Darboux cyclidesMathematics::Differential Geometry[MATH] Mathematics [math][MATH]Mathematics [math]quadrics53C12ComputingMilieux_MISCELLANEOUS
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From Dupin cyclides to scaled cyclides

2003

Dupin cyclides are algebraic surfaces introduced for the first time in 1822 by the French mathematician Pierre-Charles Dupin. They have a low algebraic degree and have been proposed as a solution to a variety of geometric modeling problems. The circular curvature line’s property facilitates the construction of the cyclide (or the portion of a cyclide) that blends two circular quadric primitives. In this context of blending, the only drawback of cyclides is that they are not suitable for the blending of elliptic quadric primitives. This problem requires the use of non circular curvature blending surfaces. In this paper, we present another formulation of cyclides: Scaled cyclides. A scaled cy…

geometric modellinggeometrické modelovánísupercyklidyDupin cyclidesBézier surfacesMathematics::Differential GeometryDupinovy cyklidyBéziérovy plochysupercyclides
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