Title :
Adaptive fairing of surface meshes by geometric diffusion
Author :
Bajaj, Chandrajit L. ; Xu, Guoliang
Author_Institution :
Dept. of Comput. Sci., Texas Univ., Austin, TX, USA
Abstract :
In triangulated surface meshes, there are often very noticeable size variances (the vertices are distributed unevenly). The presented noise of such surface meshes is therefore composite of vast frequencies. We solve a diffusion partial differential equation numerically for noise removal of arbitrary triangular manifolds using an adaptive time discretization. The proposed approach is simple and is easy to incorporate into any uniform timestep diffusion implementation with significant improvements over evolution results with the uniform timesteps. As an additional alternative to the adaptive discretization in the time direction, we also provide an approach for the choice of an adaptive diffusion tensor in the diffusion equation
Keywords :
computational geometry; partial differential equations; Loop subdivision; adaptive diffusion tensor; adaptive fairing; adaptive time discretization; arbitrary triangular manifolds; diffusion equation; diffusion partial differential equation; geometric diffusion; heat equation; noise removal; size variances; surface mesh denoising; surface meshes; triangulated surface meshes; uniform timestep diffusion implementation; Differential equations; Filters; Frequency; Image processing; Laplace equations; Low-frequency noise; Noise reduction; Partial differential equations; Smoothing methods; Tensile stress;
Conference_Titel :
Information Visualisation, 2001. Proceedings. Fifth International Conference on
Conference_Location :
London
Print_ISBN :
0-7695-1195-3
DOI :
10.1109/IV.2001.942137
