Results 151 to 160 of about 456 (184)
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Optimistic parallel Delaunay triangulation

The Visual Computer, 2002
The paper describes a new parallel algorithm of Delaunay triangulation based on randomized incremental insertion. The algorithm is practical, simple and can be modified also for constrained triangulation or tetrahedralization. It was developed for architectures with a lower degree of parallelism, such as several-processor workstations, and tested on up
Ivana Kolingerová, Josef Kohout
openaire   +1 more source

Delaunay triangulation in three dimensions

IEEE Computer Graphics and Applications, 1995
Triangulation in two and higher dimensions began with Dirichlet, Voronoi, Thiessen, and Delaunay. A number of textbooks and papers have extensively covered the properties of triangulations and algorithms for their construction. Most dealt with theoretical aspects of the algorithms and gave upper bounds on their complexity.
Tsung-Pao Fang, Les A. Piegl
openaire   +1 more source

Fast Localized Delaunay Triangulation

2005
A localized Delaunay triangulation owns the following interesting properties in a wireless ad hoc setting: it can be built with localized information, the communication cost imposed by control information is limited and it supports geographical routing algorithms that offer guaranteed convergence. This paper presents a localized algorithm that builds a
Filipe Araújo, Luís E. T. Rodrigues
openaire   +1 more source

Structural tolerance and Delaunay triangulation

Information Processing Letters, 1999
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Manuel Abellanas   +2 more
openaire   +2 more sources

Decremental Delaunay triangulation

ACM SIGGRAPH 99 Conference abstracts and applications, 1999
Richard Hammersley, Hongqian Lu
openaire   +1 more source

Minimal Delaunay Triangulations of Hyperbolic Surfaces

Discrete and Computational Geometry, 2022
Matthijs Ebbens   +2 more
exaly  

Delaunay and Regular Triangulations as Lexicographic Optimal Chains

Discrete and Computational Geometry, 2023
David Cohen-Steiner, André Lieutier
exaly  

Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations

CAD Computer Aided Design, 2020
Zipeng Ye, Ran Yi, Wenyong Gong
exaly  

On the number of higher order Delaunay triangulations

Theoretical Computer Science, 2011
Maria Saumell, Rodrigo I Silveira
exaly  

Generating realistic terrains with higher-order Delaunay triangulations

Computational Geometry: Theory and Applications, 2007
Marc Van Kreveld, Maarten Löffler
exaly  

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