AbstractWe characterize the complexity of a number of basic optimization problems for unit disk graphs specified hierarchically as in [2, 17, 19, 20]. Both PSPACE-hardness results and polynomial time approximations are presented for most of the problems considered. These problems include minimum vertex coloring, maximum independent set, minimum clique cover, minimum dominating set and minimum independent dominating set. Each of our PSPACE-hardness results holds, when the hierarchical specifications are 1-level restricted and the graphs are specified hierarchically either as in [2] or as in [19]. The hardness results presented here significantly extend the hardness results in [2, 19]. The approximation algorithms presented here along with ou...
We consider several graph theoretic problems on unit disk graphs (Maximum Independent Set, Minimum V...
We consider several graph theoretic problems on unit disk graphs (Maximum Independent Set, Minimum V...
We study the complexity of various combinatorial and satisfiability problems when instances are spec...
AbstractWe characterize the complexity of a number of basic optimization problems for unit disk grap...
We extend the concept of polynomial time approximation algorithms to apply to problems for hier-arch...
A unit disk graph is the intersection graph of a family of unit disks in the plane. If the disks do ...
Abstract. A disk graph is the intersection graph of a set of disks with arbitrary diameters in the p...
Numerous approximation algorithms for unit disk graphs have been proposed in the literature, exhibit...
A unit disk graph is the intersection graph of n congruent disks in the plane. Dominating sets in un...
Abstract This paper treats unit disk graphs whose vertices are located in a square-shaped region wit...
International audienceWe consider the maximum (weight) independent set problem in unit disk graphs. ...
AbstractUnit disk graphs are the intersection graphs of equal sized circles in the plane: they provi...
Hierarchical specifications of graphs have been widely used in many important applications, such as ...
We prove that the max-cut and max-bisection problems are NP-hard on unit disk graphs. We also show t...
We present a polynomial-time approximation scheme (PTAS) for the minimum dominating set problem in u...
We consider several graph theoretic problems on unit disk graphs (Maximum Independent Set, Minimum V...
We consider several graph theoretic problems on unit disk graphs (Maximum Independent Set, Minimum V...
We study the complexity of various combinatorial and satisfiability problems when instances are spec...
AbstractWe characterize the complexity of a number of basic optimization problems for unit disk grap...
We extend the concept of polynomial time approximation algorithms to apply to problems for hier-arch...
A unit disk graph is the intersection graph of a family of unit disks in the plane. If the disks do ...
Abstract. A disk graph is the intersection graph of a set of disks with arbitrary diameters in the p...
Numerous approximation algorithms for unit disk graphs have been proposed in the literature, exhibit...
A unit disk graph is the intersection graph of n congruent disks in the plane. Dominating sets in un...
Abstract This paper treats unit disk graphs whose vertices are located in a square-shaped region wit...
International audienceWe consider the maximum (weight) independent set problem in unit disk graphs. ...
AbstractUnit disk graphs are the intersection graphs of equal sized circles in the plane: they provi...
Hierarchical specifications of graphs have been widely used in many important applications, such as ...
We prove that the max-cut and max-bisection problems are NP-hard on unit disk graphs. We also show t...
We present a polynomial-time approximation scheme (PTAS) for the minimum dominating set problem in u...
We consider several graph theoretic problems on unit disk graphs (Maximum Independent Set, Minimum V...
We consider several graph theoretic problems on unit disk graphs (Maximum Independent Set, Minimum V...
We study the complexity of various combinatorial and satisfiability problems when instances are spec...