Add to ORKGIn 1923, Eduard Helly published his celebrated theo-rem, which originated the well known Helly property. Say that a family of subsets has the Helly property when every subfamily of it, formed by pairwise intersecting subsets, contains a common element. There are many generaliza-tions of this property which are relevant to some parts of mathematics and several applications in computer sci-ence. In this work, we survey computational aspects of the Helly property. The main focus is algorithmic. That is, we describe algorithms for solving different problems arising from the basic Helly property. We also discuss the complexity of these problems, some of them leading to NP-hardness results
AbstractA finite set system (hypergraph)H is said to have the Helly property if the members of each ...
We will discuss several quantitative Helly theorems, where we characterize families of convex sets w...
We will discuss several quantitative Helly theorems, where we characterize families of convex sets w...
Submitted by Elaine Almeida (elaine.almeida@nce.ufrj.br) on 2017-05-12T14:03:31Z No. of bitstreams:...
AbstractThe definition of the Helly property for hypergraphs was motivated by the Helly theorem for ...
In this paper we present a variety of problems in the interface between combinatorics and geometry a...
A graph is clique-Helly when its cliques satisfy the Helly property. A graph is hereditary clique-He...
A graph is clique-Helly when its cliques satisfy the Helly property. A graph is hereditary clique-He...
AbstractThe definition of the Helly property for hypergraphs was motivated by the Helly theorem for ...
AbstractThe notion of strong p-Helly hypergraphs was introduced by Golumbic and Jamison in 1985 [M.C...
A family F of subsets of some set is intersecting when sets of F pairwise intersect. The family F is...
AbstractIn this article we characterize bipartite graphs whose associated neighborhood hypergraphs h...
AbstractLet p⩾1 and q⩾0 be integers. A family of sets F is (p,q)-intersecting when every subfamily F...
Recent combinatorial algorithms for linear programming can also be applied to certain non-linear pro...
AbstractMotivated by the famous theorem of Helly on convex sets of Rd, a finite set system F is said...
AbstractA finite set system (hypergraph)H is said to have the Helly property if the members of each ...
We will discuss several quantitative Helly theorems, where we characterize families of convex sets w...
We will discuss several quantitative Helly theorems, where we characterize families of convex sets w...
Submitted by Elaine Almeida (elaine.almeida@nce.ufrj.br) on 2017-05-12T14:03:31Z No. of bitstreams:...
AbstractThe definition of the Helly property for hypergraphs was motivated by the Helly theorem for ...
In this paper we present a variety of problems in the interface between combinatorics and geometry a...
A graph is clique-Helly when its cliques satisfy the Helly property. A graph is hereditary clique-He...
A graph is clique-Helly when its cliques satisfy the Helly property. A graph is hereditary clique-He...
AbstractThe definition of the Helly property for hypergraphs was motivated by the Helly theorem for ...
AbstractThe notion of strong p-Helly hypergraphs was introduced by Golumbic and Jamison in 1985 [M.C...
A family F of subsets of some set is intersecting when sets of F pairwise intersect. The family F is...
AbstractIn this article we characterize bipartite graphs whose associated neighborhood hypergraphs h...
AbstractLet p⩾1 and q⩾0 be integers. A family of sets F is (p,q)-intersecting when every subfamily F...
Recent combinatorial algorithms for linear programming can also be applied to certain non-linear pro...
AbstractMotivated by the famous theorem of Helly on convex sets of Rd, a finite set system F is said...
AbstractA finite set system (hypergraph)H is said to have the Helly property if the members of each ...
We will discuss several quantitative Helly theorems, where we characterize families of convex sets w...
We will discuss several quantitative Helly theorems, where we characterize families of convex sets w...