Tiling the sphere with rational bezier patches

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Publication Type technical report
School or College College of Engineering
Department Computing, School of
Creator Cobb, James E.
Title Tiling the sphere with rational bezier patches
Date 1994
Description One of the fundamental problems in Computer Aided Geometric Design (CAGD) is the representation of shapes. Two representation schemes that have proved useful for modeling free-form shapes are parametric Bezier and B-spline surfaces [2,8]. In fact the Bezier patch is a special case of the B-spline surface. Therefore remarks below about B-spline surfaces apply as well to Bezier patches. For some modeling systems the B-spline or Bezier representation is the base upon which other shape descriptions rest. For example, the Unisurf system [2] uses Bezier patches, and the Alpha_l system relies on B-splines. For such a modeling system it is necessary to provide adequate representation of simple shapes (e.g. spheres, ellipsoids, and cones) in terms of the more general scheme. One would like the underlying representation to be exact, with accuracy limited only by the numeric representation within the computer, not by the choice of representation. Furthermore, this representation should avoid degeneracies that would impair the robustness of the modeling system.
Type Text
Publisher University of Utah
Subject Tiling; rational Bezier patches; Computer Aided Geometric Design; CAGD; B-spline surface
Subject LCSH Computer-aided design; Sphere--Computer simulation
Language eng
Bibliographic Citation Cobb, J. E. (1988). Tiling the sphere with rational bezier patches. 1-14. UUCS-88-009.
Series University of Utah Computer Science Technical Report
Relation is Part of ARPANET
Rights Management ©University of Utah
Format Medium application/pdf
Format Extent 4,469,181 bytes
Identifier ir-main,16147
ARK ark:/87278/s61g14n6
Setname ir_uspace
ID 705214
Reference URL https://collections.lib.utah.edu/ark:/87278/s61g14n6