Please use this identifier to cite or link to this item: http://hdl.handle.net/10553/54467
Title: The seven-triangle longest-side partition of triangles and mesh quality improvement
Authors: Márquez, Alberto
Moreno-González, Auxiliadora
Plaza, Ángel 
Suárez, José P. 
UNESCO Clasification: 120601 Construcción de algoritmos
Keywords: Refinement
Longest-edge based algorithms
Improvement of mesh quality
Issue Date: 2008
Journal: Finite Elements in Analysis and Design 
Abstract: A new triangle partition, the seven-triangle longest-edge partition, based on the trisection of the edges is presented and the associated mesh quality improvement property, discussed. The seven-triangle longest-edge (7T-LE) partition of a triangle t is obtained by putting two equally spaced points per edge. After cutting off three triangles at the corners, the remaining hexagon is subdivided further by joining each point of the longest-edge of t to the base points of the opposite sub-triangle. Finally, the interior quadrangle is subdivided into two sub-triangles by the shortest diagonal. The self-improvement property of the 7T-LE partition is discussed, delimited and compared to the parallel property of the four-triangle longest-edge (4T-LE) partition. Global refinement strategies, combining longest-edge with self-similar partitions, are proposed, based on the theoretical geometrical properties.
URI: http://hdl.handle.net/10553/54467
ISSN: 0168-874X
DOI: 10.1016/j.finel.2008.04.007
Source: Finite Elements in Analysis and Design [ISSN 0168-874X], v. 44, p. 748-758
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