AbstractThis note proposes a simple rule to determine a unique triangulation among all Delaunay triangulations of a planar point set, based on two preferred directions. We show that the triangulation can be generated by extending Lawson's edge-swapping algorithm and that point deletion is a local procedure. The rule can be implemented exactly when the points have integer coordinates and can be used to improve image compression methods
Dillencourt [1] showed that all maximal outerplanar graphs can be realized as Delaunay triangulation...
AbstractWe describe an algorithm which, for any piecewise linear complex (PLC) in 3D, builds a Delau...
We present algorithms to produce Delaunay meshes from arbitrary triangle meshes by edge flipping and...
AbstractThis note proposes a simple rule to determine a unique triangulation among all Delaunay tria...
International audienceThe Delaunay triangulation and the weighted Delaunay triangulation are not uni...
AbstractThe Delaunay triangulation and the weighted Delaunay triangulation are not uniquely defined ...
Delaunay triangulations of a point set in the Euclidean plane are ubiquitous in a number of computat...
AbstractWe present a new linear time algorithm to compute a good order for the point set of a Delaun...
AbstractWe introduce a bichromatic Delaunay quadrangulation principle by assigning the vertices of a...
AbstractFor a set P of points in the plane, we introduce a class of triangulations that is an extens...
International audienceThis paper presents how the space of spheres and shelling may be used to delet...
International audienceThis article presents the formal proof of correctness for a plane Delaunay tri...
We present two new Delaunay refinement algorithms, second an extension of the first. For a given inp...
International audienceThough Delaunay triangulations are very well known geometric data structures, ...
This work presents an algorithm that given a generalized planar graph obtains its Constrained Delaun...
Dillencourt [1] showed that all maximal outerplanar graphs can be realized as Delaunay triangulation...
AbstractWe describe an algorithm which, for any piecewise linear complex (PLC) in 3D, builds a Delau...
We present algorithms to produce Delaunay meshes from arbitrary triangle meshes by edge flipping and...
AbstractThis note proposes a simple rule to determine a unique triangulation among all Delaunay tria...
International audienceThe Delaunay triangulation and the weighted Delaunay triangulation are not uni...
AbstractThe Delaunay triangulation and the weighted Delaunay triangulation are not uniquely defined ...
Delaunay triangulations of a point set in the Euclidean plane are ubiquitous in a number of computat...
AbstractWe present a new linear time algorithm to compute a good order for the point set of a Delaun...
AbstractWe introduce a bichromatic Delaunay quadrangulation principle by assigning the vertices of a...
AbstractFor a set P of points in the plane, we introduce a class of triangulations that is an extens...
International audienceThis paper presents how the space of spheres and shelling may be used to delet...
International audienceThis article presents the formal proof of correctness for a plane Delaunay tri...
We present two new Delaunay refinement algorithms, second an extension of the first. For a given inp...
International audienceThough Delaunay triangulations are very well known geometric data structures, ...
This work presents an algorithm that given a generalized planar graph obtains its Constrained Delaun...
Dillencourt [1] showed that all maximal outerplanar graphs can be realized as Delaunay triangulation...
AbstractWe describe an algorithm which, for any piecewise linear complex (PLC) in 3D, builds a Delau...
We present algorithms to produce Delaunay meshes from arbitrary triangle meshes by edge flipping and...