Title :
C1 bicubic splines over general T-meshes
Author :
Li, Xin ; Deng, Jiansong ; Chen, Falai
Author_Institution :
Dept. of Math., Univ. of Sci. & Technol. of China, Hefei, China
Abstract :
The present authors have introduced polynomial splines over T-meshes (PHT-splines) and provided the theories and applications for PHT-splines over hierarchical T-meshes. This paper generalizes PHT-splines to arbitrary topology over general T-meshes with any structures. The general PHT-spline surfaces can be constructed through an unified scheme to interpolate the local geometric information at the basis vertices of the T-mesh. We also discuss the edge insertion and removal algorithms for PHT-splines over general T-meshes. As applications, we present algorithms to construct a spline surface over a T-mesh from a quadrilateral mesh.
Keywords :
computational geometry; interpolation; mesh generation; splines (mathematics); surface fitting; topology; C1 bicubic spline; PHT-spline surface; arbitrary topology; edge insertion algorithm; edge removal algorithm; general hierarchical T-mesh; interpolation; local geometric information; polynomial spline; quadrilateral mesh; Finite element methods; Interpolation; Mathematics; Polynomials; Spline; Surface fitting; Surface reconstruction; Surface topography; Topology; Basis Function; PHT-splines; Splines; T-meshes;
Conference_Titel :
Computer-Aided Design and Computer Graphics, 2009. CAD/Graphics '09. 11th IEEE International Conference on
Conference_Location :
Huangshan
Print_ISBN :
978-1-4244-3699-6
Electronic_ISBN :
978-1-4244-3701-6
DOI :
10.1109/CADCG.2009.5246927
