Title :
On Spherical Product Surfaces in E3
Author :
Arslan, Kadri ; Bulca, Betül ; Bayram, Bengü Kiliç ; Öztürk, Günay ; Ugail, Hassan
Author_Institution :
Dept. of Math., Uludag Univ., Bursa, Turkey
Abstract :
In the present study we consider spherical product surfaces X = alpha otimes beta of two 2D curves in E3. We prove that if a spherical product surface patch X = alpha otimes beta has vanishing Gaussian curvature K (i.e. a flat surface) then either a or b is a straight line. Further, we prove that if alpha(u) is a straight line and b(v) is a 2D curve then the spherical product is a non-minimal and flat surface. We also prove that if beta(v) is a straight line passing through origin and alpha(u) is any 2D curve (which is not a line) then the spherical product is both minimal and flat. We also give some examples of spherical product surface patches with potential applications to visual cyberworlds.
Keywords :
computational geometry; curve fitting; surface fitting; 2D curve; E3; geometric solid; spherical product surface patch; Application software; Computational geometry; Computer graphics; Computer vision; Context modeling; Deformable models; Informatics; Mathematics; Shape; Solid modeling; Spherical product surface; function based geometry modelling; minimal surfaces;
Conference_Titel :
CyberWorlds, 2009. CW '09. International Conference on
Conference_Location :
Bradford
Print_ISBN :
978-1-4244-4864-7
Electronic_ISBN :
978-0-7695-3791-7
