Delaunay and Gabriel graphs are widely studied geo-metric proximity structures. Motivated by applications in wireless routing, relaxed versions of these graphs known as Locally Delaunay Graphs (LDGs) and Lo-cally Gabriel Graphs (LGGs) have been proposed. We propose another generalization of LGGs called Gener-alized Locally Gabriel Graphs (GLGGs) in the context when certain edges are forbidden in the graph. Unlike a Gabriel Graph, there is no unique LGG or GLGG for a given point set because no edge is necessarily in-cluded or excluded. This property allows us to choose an LGG/GLGG that optimizes a parameter of interest in the graph. We show that computing an edge max-imum GLGG for a given problem instance is NP-hard and also APX-hard. We als...
Given a set P of n points in the plane, the order-k Gabriel graph on P, denoted by k-GG, has an edge...
A localized Delaunay triangulation owns the following interesting properties in a wireless ad hoc se...
We study Hamiltonicity for some of the most general variants of Delaunay and Gabriel graphs. Instead...
Delaunay and Gabriel graphs are widely studied geo-metric proximity structures. Motivated by applica...
Let be a set of points in the plane. A geometric graph on is said to be locally Gabriel if for every...
In this thesis, we focus on the study of computational and combinatorial problems on various geometr...
AbstractA connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertice...
International audienceGabriel Graphs are subgraphs of Delaunay graphs that are used in many domains ...
A connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertices does n...
We study a new family of geometric graphs that interpolate between the Delaunay triangulation and th...
A localized Delaunay triangulation owns the following interesting properties for sensor and wireless...
AbstractGiven a set of n points in the plane, any β-skeleton and [γ0,γ1]-graph can be computed in qu...
We consider two classes of higher order proximity graphs defined on a set of points in the plane, na...
International audienceGiven a graph, a geodetic set (resp. edge geodetic set) is a subset of vertice...
We prove that computing a geometric minimum-dilation graph on a given set of points in the plane, us...
Given a set P of n points in the plane, the order-k Gabriel graph on P, denoted by k-GG, has an edge...
A localized Delaunay triangulation owns the following interesting properties in a wireless ad hoc se...
We study Hamiltonicity for some of the most general variants of Delaunay and Gabriel graphs. Instead...
Delaunay and Gabriel graphs are widely studied geo-metric proximity structures. Motivated by applica...
Let be a set of points in the plane. A geometric graph on is said to be locally Gabriel if for every...
In this thesis, we focus on the study of computational and combinatorial problems on various geometr...
AbstractA connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertice...
International audienceGabriel Graphs are subgraphs of Delaunay graphs that are used in many domains ...
A connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertices does n...
We study a new family of geometric graphs that interpolate between the Delaunay triangulation and th...
A localized Delaunay triangulation owns the following interesting properties for sensor and wireless...
AbstractGiven a set of n points in the plane, any β-skeleton and [γ0,γ1]-graph can be computed in qu...
We consider two classes of higher order proximity graphs defined on a set of points in the plane, na...
International audienceGiven a graph, a geodetic set (resp. edge geodetic set) is a subset of vertice...
We prove that computing a geometric minimum-dilation graph on a given set of points in the plane, us...
Given a set P of n points in the plane, the order-k Gabriel graph on P, denoted by k-GG, has an edge...
A localized Delaunay triangulation owns the following interesting properties in a wireless ad hoc se...
We study Hamiltonicity for some of the most general variants of Delaunay and Gabriel graphs. Instead...