International audienceThe convex hulls construction is mostly known from the point of view of 2D Euclidean geometry where it associates to a given set of points called seeds, the smallest convex polygon containing these seeds. For the cellular automata case, different adaptations of the definition and associated constructions have been proposed to fit with the discreteness of the cellular spaces. We review some of these propositions and show the link with the famous majority and voting rules. We then unify all these definitions in a unique framework using metric spaces and provide a general solution to the problem. This will lead us to an understanding of the convex hull construction as a chase for shortest paths. This emphases the importan...
We study generalizations of convex hulls to polygonal domains with holes. Convexity in Euclidean spa...
AbstractA set of points S of a graph is convex if any geodesic joining two points of S lies entirely...
A set S of vertices of a connected graph G is convex, if for any pair of vertices u,vS, every shorte...
International audienceThe convex hulls construction is mostly known from the point of view of 2D Euc...
International audienceIn the cellular automata domain, the discrete convex hull computation rules pr...
International audienceGabriel Graphs are subgraphs of Delaunay graphs that are used in many domains ...
AbstractThe usual distance between pairs of vertices in a graph naturally gives rise to the notion o...
The construction of the convex hull of a finite point set in a low-dimensional Euclidean space is a...
In the geodetic convexity, a set of vertices S of a graph G is convex if all vertices belonging to a...
International audienceBoundaries and Hulls of Euclidean Graphs: From Theory to Practice presents con...
Finding the convex hull of a finite set of points is important not only for practical applications b...
The convex hull has been extensively studied in computational geometry and its applications have spr...
The concept of convex extendability is introduced to answer the problem of finding the smallest dis...
International audienceWe prove that, given a closure function the smallest preimage of a closed set ...
We study generalizations of convex hulls to polygonal domains with holes. Convexity in Euclidean spa...
AbstractA set of points S of a graph is convex if any geodesic joining two points of S lies entirely...
A set S of vertices of a connected graph G is convex, if for any pair of vertices u,vS, every shorte...
International audienceThe convex hulls construction is mostly known from the point of view of 2D Euc...
International audienceIn the cellular automata domain, the discrete convex hull computation rules pr...
International audienceGabriel Graphs are subgraphs of Delaunay graphs that are used in many domains ...
AbstractThe usual distance between pairs of vertices in a graph naturally gives rise to the notion o...
The construction of the convex hull of a finite point set in a low-dimensional Euclidean space is a...
In the geodetic convexity, a set of vertices S of a graph G is convex if all vertices belonging to a...
International audienceBoundaries and Hulls of Euclidean Graphs: From Theory to Practice presents con...
Finding the convex hull of a finite set of points is important not only for practical applications b...
The convex hull has been extensively studied in computational geometry and its applications have spr...
The concept of convex extendability is introduced to answer the problem of finding the smallest dis...
International audienceWe prove that, given a closure function the smallest preimage of a closed set ...
We study generalizations of convex hulls to polygonal domains with holes. Convexity in Euclidean spa...
AbstractA set of points S of a graph is convex if any geodesic joining two points of S lies entirely...
A set S of vertices of a connected graph G is convex, if for any pair of vertices u,vS, every shorte...