Compatible Triangulations of Spatial Decompositions

William J. Schroeder; Berk Geveci; Mathieu Malaterre

doi:10.1109/VISUAL.2004.15

I
IEEE_VIS
2004
15th IEEE Visualization 2004 (VIS 2004)
Abstract - Compatible Triangulations of Spatial Decompositions

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15th IEEE Visualization 2004 (VIS 2004)

Compatible Triangulations of Spatial Decompositions

Austin, Texas

October 10-October 15

ISBN: 0-7803-8788-0

	ASCII Text	x
	William J. Schroeder, Berk Geveci, Mathieu Malaterre, "Compatible Triangulations of Spatial Decompositions," Visualization Conference, IEEE, pp. 211-218, 15th IEEE Visualization 2004 (VIS 2004), 2004.

	BibTex	x
	@article{ 10.1109/VISUAL.2004.15, author = {William J. Schroeder and Berk Geveci and Mathieu Malaterre}, title = {Compatible Triangulations of Spatial Decompositions}, journal ={Visualization Conference, IEEE}, volume = {0}, year = {2004}, isbn = {0-7803-8788-0}, pages = {211-218}, doi = {http://doi.ieeecomputersociety.org/10.1109/VISUAL.2004.15}, publisher = {IEEE Computer Society}, address = {Los Alamitos, CA, USA}, }

	RefWorks Procite/RefMan/Endnote	x
	TY - CONF JO - Visualization Conference, IEEE TI - Compatible Triangulations of Spatial Decompositions SN - 0-7803-8788-0 SP211 EP218 A1 - William J. Schroeder, A1 - Berk Geveci, A1 - Mathieu Malaterre, PY - 2004 KW - triangulation KW - tetrahedrization KW - adaptive grid KW - clipping KW - contouring KW - template KW - Delaunay KW - parallel VL - 0 JA - Visualization Conference, IEEE ER -

William J. Schroeder, Kitware, Inc.

Berk Geveci, Kitware, Inc.

Mathieu Malaterre, Kitware, Inc.

DOI Bookmark: http://doi.ieeecomputersociety.org/10.1109/VISUAL.2004.15

We describe a general algorithm to produce compatible 3D triangulations from spatial decompositions. Such triangulations match edges and faces across spatial cell boundaries, solving several problems in graphics and visualization including the crack problem found in adaptive isosurface generation, triangulation of arbitrary grids (including unstructured grids), clipping, and the interval tetrahedrization problem. The algorithm produces compatible triangulations on a cell-by-cell basis, using a modified Delaunay triangulation with a simple point ordering rule to resolve degenerate cases and produce unique triangulations across cell boundaries. The algorithm is naturally parallel since it requires no neighborhood cell information, only a unique, global point numbering. We show application of this algorithm to adaptive contour generation; tetrahedrization of unstructured meshes; clipping and interval volume mesh generation.

Index Terms:

triangulation, tetrahedrization, adaptive grid, clipping, contouring, template, Delaunay, parallel

Citation:

William J. Schroeder, Berk Geveci, Mathieu Malaterre, "Compatible Triangulations of Spatial Decompositions," ieee_vis, pp.211-218, 15th IEEE Visualization 2004 (VIS 2004), 2004

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