The hitting set problem is a well-known NP-hard optimization problem in which, given a set of elements and a collection of subsets, the goal is to find the smallest selection of elements, such that each subset contains at least one element in the selection. Many geometric set systems enjoy improved approximation ratios, which have recently been shown to be tight with respect to the shallow cell complexity of the set system. The algorithms that exploit the cell complexity, however, tend to be involved and computationally intensive. This paper shows that a slightly improved asymptotic approximation ratio for the hitting set problem can be attained using a much simpler algorithm: solve the linear programming relaxation, take one initial random...
In the Set Cover problem, we are given a set system with each set having a weight, and we want to fi...
The packing lemma of Haussler states that given a set system (X,R) with bounded VC dimension, if eve...
International audienceShowing the existence of small-sized epsilon-nets has been the subject of inve...
International audienceThe geometric hitting set problem is one of the basic geometric com-binatorial...
International audienceThe geometric hitting set problem is one of the basic geometric combinatorial ...
The hitting set problem asks for a collection of sets over a universe $U$ to find a minimum subset o...
International audienceThe geometric hitting set problem is one of the basic geometric combinatorial ...
The analysis of approximation techniques is a key topic in computational geometry, both for practica...
AbstractGiven a collection C of subsets of size three of a finite set S and a positive integer k, th...
Given a set system (X, R) with VC-dimension d, the celebrated result of Haussler and Welzl (1987) sh...
The minimum set cover problem is, without question, among the most ubiquitous and well-studied probl...
AbstractIn the hitting set problem one is given m subsets of a finite set N and one has to find an X...
We consider the problem of finding a small hitting set in an infinite range space F=(Q,R) of bounded...
We study the complexity of the Hitting Set problem in set systems (hypergraphs) that avoid certain s...
International audienceOver the past several decades there has been steady progress towards the goal ...
In the Set Cover problem, we are given a set system with each set having a weight, and we want to fi...
The packing lemma of Haussler states that given a set system (X,R) with bounded VC dimension, if eve...
International audienceShowing the existence of small-sized epsilon-nets has been the subject of inve...
International audienceThe geometric hitting set problem is one of the basic geometric com-binatorial...
International audienceThe geometric hitting set problem is one of the basic geometric combinatorial ...
The hitting set problem asks for a collection of sets over a universe $U$ to find a minimum subset o...
International audienceThe geometric hitting set problem is one of the basic geometric combinatorial ...
The analysis of approximation techniques is a key topic in computational geometry, both for practica...
AbstractGiven a collection C of subsets of size three of a finite set S and a positive integer k, th...
Given a set system (X, R) with VC-dimension d, the celebrated result of Haussler and Welzl (1987) sh...
The minimum set cover problem is, without question, among the most ubiquitous and well-studied probl...
AbstractIn the hitting set problem one is given m subsets of a finite set N and one has to find an X...
We consider the problem of finding a small hitting set in an infinite range space F=(Q,R) of bounded...
We study the complexity of the Hitting Set problem in set systems (hypergraphs) that avoid certain s...
International audienceOver the past several decades there has been steady progress towards the goal ...
In the Set Cover problem, we are given a set system with each set having a weight, and we want to fi...
The packing lemma of Haussler states that given a set system (X,R) with bounded VC dimension, if eve...
International audienceShowing the existence of small-sized epsilon-nets has been the subject of inve...