Stability Aware Delaunay Refinement

Author

Gewali, Laxmi P. ; Acharya, Bibhudendra

Author_Institution

Dept. of Comput. Sci., Univ. of Nevada, Las Vegas, NV, USA

fYear

2014

fDate

7-9 April 2014

Firstpage

587

Lastpage

592

Abstract

Good quality meshes are extensively used for finding approximate solutions for partial differential equations for fluid flow in two dimensional surfaces. We present an overview of existing algorithms for refinement and generation of triangular meshes. We introduce the concept of node stability in the refinement of Delaunay triangulation. We present an algorithm based on the location of center of gravity of two dimensional shapes to place a candidate refinement node so that the newly placed node has increased stability. The algorithm runs in O(n2) time, where n is the number of nodes in the mesh.

Keywords

approximation theory; computational complexity; computational geometry; mesh generation; partial differential equations; 2D surfaces; approximate solutions; center-of-gravity; fluid flow; node stability; partial differential equations; refinement node; stability aware Delaunayy refinement; triangular mesh generation; triangular mesh refinement; Algorithm design and analysis; Computational geometry; Finite element analysis; Gravity; Refining; Shape; Stability analysis; Delaynay Refinement; quality mesh; triangulation;

fLanguage

English

Publisher

ieee

Conference_Titel

Information Technology: New Generations (ITNG), 2014 11th International Conference on

Conference_Location

Las Vegas, NV

Print_ISBN

978-1-4799-3187-3

Type

conf

DOI

10.1109/ITNG.2014.35

Filename

6822261