AbstractThis paper presents a new algorithm for the convex hull problem, which is based on a reduction to a combinatorial decision problem CompletenessC, which in turn can be solved by a simplicial homology computation. Like other convex hull algorithms, our algorithm is polynomial (in the size of input plus output) for simplicial or simple input. We show that the “no”-case of CompletenessC has a certificate that can be checked in polynomial time (if integrity of the input is guaranteed)
AbstractThis article presents the formal design of a functional algorithm which computes the convex ...
Despite a huge number of algorithms and articles published on robsustness issues relating to the con...
The construction of the convex hull of a finite point set in a low-dimensional Euclidean space is a...
AbstractThis paper presents a new algorithm for the convex hull problem, which is based on a reducti...
AbstractWe investigate the computational complexity of computing the convex hull of a two-dimensiona...
International audienceWe study the development of formally proved algorithms for computational geome...
AbstractThe study of monophonic convexity is based on the family of induced paths of a graph. The cl...
In general dimension, there is no known total polynomial algorithm for either convex hull or vertex ...
A polytope is the bounded intersection of a finite set of halfspaces of R d . Every polytope can a...
In a connected hypergraph a vertex set X is simple-path convex (sp-convex, for short) if either |X|≤...
AbstractAn n log n lower bound is found for linear decision tree algorithms with integer inputs that...
A set of planar objects is said to be of type m if the convex hull of any two objects has its size b...
The goal of the current paper is to introduce the notion of certificates which verify the accuracy o...
We show that any parallel algorithm in the fixed degree algebraic decision tree model that answers m...
AbstractA convex polytope P can be specified in two ways: as the convex hull of the vertex set V of ...
AbstractThis article presents the formal design of a functional algorithm which computes the convex ...
Despite a huge number of algorithms and articles published on robsustness issues relating to the con...
The construction of the convex hull of a finite point set in a low-dimensional Euclidean space is a...
AbstractThis paper presents a new algorithm for the convex hull problem, which is based on a reducti...
AbstractWe investigate the computational complexity of computing the convex hull of a two-dimensiona...
International audienceWe study the development of formally proved algorithms for computational geome...
AbstractThe study of monophonic convexity is based on the family of induced paths of a graph. The cl...
In general dimension, there is no known total polynomial algorithm for either convex hull or vertex ...
A polytope is the bounded intersection of a finite set of halfspaces of R d . Every polytope can a...
In a connected hypergraph a vertex set X is simple-path convex (sp-convex, for short) if either |X|≤...
AbstractAn n log n lower bound is found for linear decision tree algorithms with integer inputs that...
A set of planar objects is said to be of type m if the convex hull of any two objects has its size b...
The goal of the current paper is to introduce the notion of certificates which verify the accuracy o...
We show that any parallel algorithm in the fixed degree algebraic decision tree model that answers m...
AbstractA convex polytope P can be specified in two ways: as the convex hull of the vertex set V of ...
AbstractThis article presents the formal design of a functional algorithm which computes the convex ...
Despite a huge number of algorithms and articles published on robsustness issues relating to the con...
The construction of the convex hull of a finite point set in a low-dimensional Euclidean space is a...