Identification and Preservation of Surface Features

A surface is often approximated by a network of triangular facets. In the absence of a precise mathematical description of the underlying surface all information about surface properties such as smoothness and curvature must be inferred from the triangulation itself. Enrichment and coarsening of the surface geometry, for example, can only be carried out if singular features, where C continity is lost, are properly accounted for. In the absence of a well defined surface geometry it is necessary to extract these features and establish suitable data structures so that the features persist after enrichment and/or coarsening of the triangulation. This paper describes a feature extraction scheme that is based on estimates of the local normals and principal curvatures at each mesh point. The feature extraction scheme has been combined with an algorithm that adapts a tetrahedral mesh by the selective enrichment and coarsening of both the volume and surface triangulation.

[1]  Timothy J. Baker Mesh deformation and modification for time dependent problems , 2003 .

[2]  William E. Lorensen,et al.  Decimation of triangle meshes , 1992, SIGGRAPH.

[3]  Markus Gross,et al.  Mesh edge detection , 2000 .

[4]  Michael T. Heath,et al.  Feature Detection for Surface Meshes , 2002 .

[5]  Pascal J. Frey,et al.  About Surface Remeshing , 2000, IMR.

[6]  J. Canny A Computational Approach to Edge Detection , 1986, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[7]  Michael Garland,et al.  Surface simplification using quadric error metrics , 1997, SIGGRAPH.

[8]  Bernd Hamann,et al.  Curvature Approximation for Triangulated Surfaces , 1993, Geometric Modelling.

[9]  John F. Canny,et al.  A Computational Approach to Edge Detection , 1986, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[10]  Houman Borouchaki,et al.  Surface mesh quality evaluation , 1999 .

[11]  Timothy J. Baker,et al.  Mesh Movement and Metamorphosis , 2002, Engineering with Computers.

[12]  R. Löhner Regridding Surface Triangulations , 1996 .

[13]  D. Struik Lectures on classical differential geometry , 1951 .