A new algorithm, featuring overlapping domain decompositions, for the parallel construction of Delaunay and Voronoi tessellations is developed. Overlapping allows for the seamless stitching of the partial pieces of the global Delaunay tessellations constructed by individual processors. The algorithm is then modified, by the addition of stereographic projections, to handle the parallel construction of spherical Delaunay and Voronoi tessellations. The algorithms are then embedded into algorithms for the parallel construction of planar and spherical centroidal Voronoi tessellations that require multiple constructions of Delaunay tessellations. This combination of overlapping domain decompositions with stereographic projections provides a uniqu...
Abstract—In this paper, we propose an efficient algorithm to compute the centroidal Voronoi tessella...
Mesh generation in regions in Euclidean space is a central task in computational science, and especi...
Intrinsic Delaunay triangulation (IDT) naturally generalizes Delaunay triangulation from R2 to curve...
Spherical centroidal Voronoi tessellations (SCVT) are used in many applications in a variety of fiel...
Computing a Voronoi or Delaunay tessellation from a set of points is a core part of the analysis of ...
Abstract—Computing a Voronoi or Delaunay tessellation from a set of points is a core part of the ana...
Abstract. The Voronoi diagram is a widely used data structure. The theory of algorithms for computin...
Abstract—We show how to localize the Delaunay triangulation of a given planar point set, namely, bou...
This paper provides a unified discussion of the Delaunay triangulation. Its geometric properties are...
To increase the efficiency when processing large data sets, a novel parallel algorithm is proposed f...
Delaunay tessellations are fundamental data structures in computational geometry. They are important...
Centroidal Voronoi tessellations (CVT) are Voronoi tessellations of a region such that the generatin...
The Voronoi diagram is a decomposition of a space, determined by distances to a given set of objects...
Abstract—Mesh tessellations are indispensable tools for an-alyzing point data because they transform...
This paper presents a new scalable parallelization scheme to generate the 3D Delaunay triangulation ...
Abstract—In this paper, we propose an efficient algorithm to compute the centroidal Voronoi tessella...
Mesh generation in regions in Euclidean space is a central task in computational science, and especi...
Intrinsic Delaunay triangulation (IDT) naturally generalizes Delaunay triangulation from R2 to curve...
Spherical centroidal Voronoi tessellations (SCVT) are used in many applications in a variety of fiel...
Computing a Voronoi or Delaunay tessellation from a set of points is a core part of the analysis of ...
Abstract—Computing a Voronoi or Delaunay tessellation from a set of points is a core part of the ana...
Abstract. The Voronoi diagram is a widely used data structure. The theory of algorithms for computin...
Abstract—We show how to localize the Delaunay triangulation of a given planar point set, namely, bou...
This paper provides a unified discussion of the Delaunay triangulation. Its geometric properties are...
To increase the efficiency when processing large data sets, a novel parallel algorithm is proposed f...
Delaunay tessellations are fundamental data structures in computational geometry. They are important...
Centroidal Voronoi tessellations (CVT) are Voronoi tessellations of a region such that the generatin...
The Voronoi diagram is a decomposition of a space, determined by distances to a given set of objects...
Abstract—Mesh tessellations are indispensable tools for an-alyzing point data because they transform...
This paper presents a new scalable parallelization scheme to generate the 3D Delaunay triangulation ...
Abstract—In this paper, we propose an efficient algorithm to compute the centroidal Voronoi tessella...
Mesh generation in regions in Euclidean space is a central task in computational science, and especi...
Intrinsic Delaunay triangulation (IDT) naturally generalizes Delaunay triangulation from R2 to curve...