International audienceWe examine the problem of computing exactly the Voronoi diagram (via the dual Delaunay graph) of a set of, possibly intersecting, smooth convex \pc in the Euclidean plane, given in parametric form. Pseudo-circles are (convex) sites, every pair of which has at most two intersecting points. The Voronoi diagram is constructed incrementally. Our first contribution is to propose robust and efficient algorithms, under the exact computation paradigm, for all required predicates, thus generalizing earlier algorithms for non-intersecting ellipses. Second, we focus on \kcn, which is the hardest predicate, and express it by a simple sparse $5\times 5$ polynomial system, which allows for an efficient implementation by means of suc...
Abstract. The Voronoi diagram is a widely used data structure. The theory of algorithms for computin...
Let P be a list of points in the plane such that the points of P taken in order form the vertices of...
Given a set of n sites in the plane, the order-k Voronoi diagram is a planar subdivision such that a...
International audienceWe examine the problem of computing exactly the Voronoi diagram (via the dual ...
We examine the problem of computing exactly the Delaunay graph (and the dual Voronoi diagram) of a s...
Abstract. We examine the problem of computing exactly the Delau-nay graph (and the dual Voronoi diag...
This paper examines the computation of the Voronoi dia-gram of a set of ellipses in the Euclidean pl...
This paper presents a dynamic algorithm for the construction of the Euclidean Voronoi diagram of a s...
Voronoi diagrams are fundamental data structures that have been extensively studied in Computational...
AbstractWe study the predicates involved in an efficient dynamic algorithm for computing the Apollon...
Most of the curves and surfaces encountered in geometric modelling are defined as the set of solutio...
Computational Geometry is a subfield of Algorithm Design and Analysis with a focus on the design and...
AbstractWe show how to divide the edge graph of a Voronoi diagram into a tree that corresponds to th...
The Voronoi diagram is a decomposition of a space, determined by distances to a given set of objects...
Using a divide, prune, and conquer approach based on geometric partitioning, we obtain: (1) An outpu...
Abstract. The Voronoi diagram is a widely used data structure. The theory of algorithms for computin...
Let P be a list of points in the plane such that the points of P taken in order form the vertices of...
Given a set of n sites in the plane, the order-k Voronoi diagram is a planar subdivision such that a...
International audienceWe examine the problem of computing exactly the Voronoi diagram (via the dual ...
We examine the problem of computing exactly the Delaunay graph (and the dual Voronoi diagram) of a s...
Abstract. We examine the problem of computing exactly the Delau-nay graph (and the dual Voronoi diag...
This paper examines the computation of the Voronoi dia-gram of a set of ellipses in the Euclidean pl...
This paper presents a dynamic algorithm for the construction of the Euclidean Voronoi diagram of a s...
Voronoi diagrams are fundamental data structures that have been extensively studied in Computational...
AbstractWe study the predicates involved in an efficient dynamic algorithm for computing the Apollon...
Most of the curves and surfaces encountered in geometric modelling are defined as the set of solutio...
Computational Geometry is a subfield of Algorithm Design and Analysis with a focus on the design and...
AbstractWe show how to divide the edge graph of a Voronoi diagram into a tree that corresponds to th...
The Voronoi diagram is a decomposition of a space, determined by distances to a given set of objects...
Using a divide, prune, and conquer approach based on geometric partitioning, we obtain: (1) An outpu...
Abstract. The Voronoi diagram is a widely used data structure. The theory of algorithms for computin...
Let P be a list of points in the plane such that the points of P taken in order form the vertices of...
Given a set of n sites in the plane, the order-k Voronoi diagram is a planar subdivision such that a...