Title :
Geometric mesh partitioning: implementation and experiments
Author :
Gilbert, John R. ; Miller, Gary L. ; Teng, Shang-Hua
Author_Institution :
Xerox Palo Alto Res. Center, CA, USA
Abstract :
We investigate a method of dividing an irregular mesh into equal-sized pieces with few interconnecting edges. The method´s novel feature is that it exploits the geometric coordinates of the mesh vertices. It is based on theoretical work of Miller, Teng, Thurston, and Vavasis, who showed that certain classes of “well-shaped” finite element meshes have good separators. The geometric method is quite simple to implement: we describe a Matlab code for it in some detail. The method is also quite efficient and effective: we compare it with some other methods, including spectral bisection
Keywords :
computational geometry; finite element analysis; mesh generation; Matlab code; equal-sized pieces; finite element meshes; geometric coordinates; geometric mesh partitioning; irregular mesh; mesh vertices; spectral bisection; Computer science; Concurrent computing; Finite element methods; Iterative methods; Large-scale systems; Mathematical model; NP-hard problem; Partial differential equations; Particle separators; Partitioning algorithms;
Conference_Titel :
Parallel Processing Symposium, 1995. Proceedings., 9th International
Conference_Location :
Santa Barbara, CA
Print_ISBN :
0-8186-7074-6
DOI :
10.1109/IPPS.1995.395965
