We address the max min vertex cover problem, which is the maximization version of the well studied MIN INDEPENDENT DOMINATING SET problem, known to be NP-hard and highly inapproximable in polynomial time. We present tight approximation results for this problem on general graphs, namely a polynomial approximation algorithm which guarantees an $n^{−1/2}$ approximation ratio, while showing that unless P = NP, the problem is inapproximable within ratio $n^{ε-(1/2)}$ for any strictly positive. We also analyze the problem on various restricted classes of graph, on which we show polynomiality or constant-approximability of the problem. Finally, we show that the problem is fixed-parameter tractable with respect to the size of an optimal solution, t...
We provide a new LP relaxation of the maximum vertex cover problem and a polynomial-time algorithm t...
International audienceWe study the approximability of the maximum size independent set (MIS) problem...
The vertex cover problem is one of the most important and intensively studied combinatorial optimiza...
International audienceWe address the max min vertex cover problem, which is the maximization version...
AbstractUsing ideas and results from polynomial time approximation and exact computation we design a...
Using ideas and results from polynomial time approximation and exact computation we design approxima...
AbstractSome open questions concerning the complexity of approximation algorithms for the Maximum In...
We consider the Max-Vertex-Cover (MVC) problem, i.e., nd k vertices from an undirected and edge-weig...
We study the polynomial time approximation of the NP-hard MAX k-VERTEX COVER problem in bipartite gr...
An edge dominating set in a graph G = (V, E) is a subset S of edges such that each edge in E − S is ...
We first devise a branching algorithm that computes a minimum independent dominating set with runnin...
We study approximation hardness of the Minimum Dominating Set problem and its variants in undirected...
The vertex cover problem is one of the most important and intensively studied combinatorial optimiza...
AbstractWe study low degree graph problems such as Maximum Independent Set and Minimum Vertex Cover....
We provide the first interesting explicit lower bounds on efficient approximability for two closely ...
We provide a new LP relaxation of the maximum vertex cover problem and a polynomial-time algorithm t...
International audienceWe study the approximability of the maximum size independent set (MIS) problem...
The vertex cover problem is one of the most important and intensively studied combinatorial optimiza...
International audienceWe address the max min vertex cover problem, which is the maximization version...
AbstractUsing ideas and results from polynomial time approximation and exact computation we design a...
Using ideas and results from polynomial time approximation and exact computation we design approxima...
AbstractSome open questions concerning the complexity of approximation algorithms for the Maximum In...
We consider the Max-Vertex-Cover (MVC) problem, i.e., nd k vertices from an undirected and edge-weig...
We study the polynomial time approximation of the NP-hard MAX k-VERTEX COVER problem in bipartite gr...
An edge dominating set in a graph G = (V, E) is a subset S of edges such that each edge in E − S is ...
We first devise a branching algorithm that computes a minimum independent dominating set with runnin...
We study approximation hardness of the Minimum Dominating Set problem and its variants in undirected...
The vertex cover problem is one of the most important and intensively studied combinatorial optimiza...
AbstractWe study low degree graph problems such as Maximum Independent Set and Minimum Vertex Cover....
We provide the first interesting explicit lower bounds on efficient approximability for two closely ...
We provide a new LP relaxation of the maximum vertex cover problem and a polynomial-time algorithm t...
International audienceWe study the approximability of the maximum size independent set (MIS) problem...
The vertex cover problem is one of the most important and intensively studied combinatorial optimiza...