Modern Geometric Computing for VisualizationToshiyasu Kunii, Yoshihisa Shinagawa |
Contents
Computer Geometry and Topological Classification | 3 |
R A Earnshaw | 16 |
Kergosien 31 | 54 |
Copyright | |
10 other sections not shown
Other editions - View all
Modern Geometric Computing for Visualization Tosiyasu L. Kunii,Yoshihisa Shinagawa Limited preview - 2012 |
Modern Geometric Computing for Visualization Tosiyasu L Kunii,Yoshihisa Shinagawa No preview available - 1992 |
Common terms and phrases
algorithm analysis applications Bézier Bézier curve called clusters complex Computer Graphics concave conjugate classification contour lines convex hull coordinates corresponding critical points crossing point curl value curvature regions curve defined described differential dimensional dp code edges engineering equations equivalent example extremal points Figure fractal geometric global Hamiltonian systems height function height relations hexagonal grid Hgram Hgram-space homotopy integrable Hamiltonian systems intersection Japan Kergosien kernel form knot diagram knot theory knotted surface Kunii linear loop manifold mapping mathematical mesh method Morse theory MTG sheet MTG-tree objects parallel parameter path Patrikalakis plane point geometry point set polygonal polynomial principal curvatures problem projection properties Reeb graph representation represented rotation saddle Scientific Visualization sequence shape Shinagawa singular points space stationary points structure Supercomputer switching pair symmetries techniques Theorem topological toroidal graph triangles University of Tokyo variables vector vertex vertices