K-set Polygons and Centroid Triangulations

El Oraiby, Wael

09 October 2009

This thesis is a contribution to a classical problem in computational and combinatorial geometry: the study of the k-sets of a set V of n points in the plane. First we introduce the notion of convex inclusion chain that is an ordering of the points of V such that no point is inside the convex hull of the points that precede it. Every k-set of an initial sub-sequence of the chain is called a k-set of the chain. We prove that the number of these k-sets is an invariant of V and is equal to the number of regions in the order-k Voronoi diagram of V. We then deduce an online algorithm for the construction of the k-sets of the vertices of a simple polygonal line such that every vertex of this line is outside the convex hull of all its preceding vertices on the line. If c is the total number of k-sets built with this algorithm, the complexity of our algorithm is in O(n log n + c log^2k) and is equal, per constructed k-set, to the complexity of the best algorithm known. Afterward, we prove that the classical divide and conquer algorithmic method can be adapted to the construction of the k-sets of V. The algorithm has a complexity of O(n log n + c log^2k log(n/k)), where c is the maximum number of k-sets of a set of n points. We finally prove that the centers of gravity of the k-sets of a convex inclusion chain are the vertices of a triangulation belonging to the family of so-called centroid triangulations. This family notably contains the dual of the order-k Voronoi diagram. We give an algorithm that builds particular centroid triangulations in O(n log n + k(n- k) log^2 k) time, which is more efficient than all the currently known algorithms.

[INFO:INFO_OH] Computer Science/Other

Computational geometry

Combinatorial geometry

Convex inclusion chains

Centroid triangulations

Voronoi diagrams

Delaunay triangulations

K-set Polygons and Centroid Triangulations / K-set Polygones et Triangulations Centroïdes

El Oraiby, Wael

09 October 2009

Cette thèse est une contribution à un problème classique de la géométrie algorithmique et combinatoire : l’étude des k-sets d’un ensemble V de n points du plan. Nous introduisons d’abord la notion de chaîne d’inclusion de convexes qui est un ordonnancement des points de V tel qu’aucun point n’appartient à l’enveloppe convexe de ceux qui le précèdent. Tout k-set d’une sous-suite commençante de la chaîne est appelé un k-set de la chaîne. Nous montrons que le nombre de ces k-sets est un invariant de V et qu’il est égal au nombre de régions du diagramme de Voronoï d’ordre k de V. Nous en déduisons un algorithme en ligne pour construire les k-sets des sommets d’une ligne polygonale simple dont chaque sommet est à l’extérieur de l’enveloppe convexe des sommets qui le précèdent sur la ligne. Si c est le nombre total de k-sets construits, la complexité de notrealgorithme est en O(n log n+c log^2 k) et est équivalente, par k-set construit, à celle du meilleur algorithme connu. Nous montrons ensuite que la méthode algorithmique classique de division-fusion peut être adaptée à la construction des k-sets de V. L’algorithme qui en résulte a une complexité enO(n log n+c log^2 k log(n/k)), où c est le nombre maximum de k-sets d’un ensemble de n points.Nous prouvons enfin que les centres de gravité des k-sets d’une chaîne d’inclusion de convexes sont les sommets d’une triangulation qui appartient à la même famille de triangulations, dites centroïdes, que le dual du diagramme de Voronoï d’ordre k. Nous en d´déduisons un algorithme qui construit des triangulations centroïdes particulières en temps O(n log n+k(n-k) log^2 k), ce qui est plus efficace que les algorithmes connus jusque là. / This thesis is a contribution to a classical problem in computational and combinatorial geometry: the study of the k-sets of a set V of n points in the plane. First we introduce the notion of convex inclusion chain that is an ordering of the points of V such that no point is inside the convex hull of the points that precede it. Every k-set of an initial sub-sequence of the chain is called a k-set of the chain. We prove that the number of these k-sets is an invariant of V and is equal to the number of regions in the order-k Voronoi diagram of V. We then deduce an online algorithm for the construction of the k-sets of the vertices of a simple polygonal line such that every vertex of this line is outside the convex hull of all its preceding vertices on the line. If c is the total number of k-sets built with this algorithm, the complexity of our algorithm is in O(n log n + c log^2k) and is equal, per constructed k-set, to the complexity of the best algorithm known. Afterward, we prove that the classical divide and conquer algorithmic method can be adapted to the construction of the k-sets of V. The algorithm has a complexity of O(n log n + c log^2k log(n/k)), where c is the maximum number of k-sets of a set of n points. We finally prove that the centers of gravity of the k-sets of a convex inclusion chain are the vertices of a triangulation belonging to the family of so-called centroid triangulations. This family notably contains the dual of the order-k Voronoi diagram. We give an algorithm that builds particular centroid triangulations in O(n log n + k(n- k) log^2 k) time, which is more efficient than all the currently known algorithms.

Géométrie algorithmique

Géométrie combinatoire

K-sets

K-set polygones

Chaînes d'inclusion de convexes

Triangulations centroïdes

Diagrammes de Voronoï

Triangulations de Delaunay

Computational geometry

Combinatorial geometry

Convex inclusion chains

Centroid triangulations

Voronoi diagrams

Delaunay triangulations