Given a hypergraph H = (V,E), what is the smallest subset X of V such that e and X are not disjoint for all e in E? This problem, known as the hitting set problem, is a basic problem in parameterized complexity theory. There are well-known kernelization algorithms for it, which get a hypergraph H and a number k as input and output a hypergraph H\u27 such that (1) H has a hitting set of size k if, and only if, H\u27 has such a hitting set and (2) the size of H\u27 depends only on k and on the maximum cardinality d of edges in H. The algorithms run in polynomial time, but are highly sequential. Recently, it has been shown that one of them can be parallelized to a certain degree: one can compute hitting set kernels in parallel time O(d) - but ...
AbstractThis article presents an infinite family of combinatorial problems that shows abrupt changes...
The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits eve...
Abstract. We study upper and lower bounds on the kernel size for the 3-hitting set problem on hyperg...
We analyze a reduction rule for computing kernels for the hitting set problem: In a hypergraph, the ...
The NP-hard Multiple Hitting Set problem is finding a minimum-cardinality set intersecting each of t...
Abstract. A sunflower in a hypergraph is a set of hyperedges pairwise in-tersecting in exactly the s...
We re-visit the complexity of polynomial time pre-processing (kernelization) for the d-Hitting Set p...
We study the complexity of the Hitting Set problem in set systems (hypergraphs) that avoid certain s...
AbstractIn the Hitting Set problem, we are given a collection F of subsets of a ground set V and an ...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
In this paper, we study the query complexity of parameterized decision and optimization versions of ...
International audienceThe Point Hyperplane Cover problem in R d takes as input a set of n points in ...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
When a problem has been shown to be NP-complete, often one has to be content with either exponential...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
AbstractThis article presents an infinite family of combinatorial problems that shows abrupt changes...
The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits eve...
Abstract. We study upper and lower bounds on the kernel size for the 3-hitting set problem on hyperg...
We analyze a reduction rule for computing kernels for the hitting set problem: In a hypergraph, the ...
The NP-hard Multiple Hitting Set problem is finding a minimum-cardinality set intersecting each of t...
Abstract. A sunflower in a hypergraph is a set of hyperedges pairwise in-tersecting in exactly the s...
We re-visit the complexity of polynomial time pre-processing (kernelization) for the d-Hitting Set p...
We study the complexity of the Hitting Set problem in set systems (hypergraphs) that avoid certain s...
AbstractIn the Hitting Set problem, we are given a collection F of subsets of a ground set V and an ...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
In this paper, we study the query complexity of parameterized decision and optimization versions of ...
International audienceThe Point Hyperplane Cover problem in R d takes as input a set of n points in ...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
When a problem has been shown to be NP-complete, often one has to be content with either exponential...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
AbstractThis article presents an infinite family of combinatorial problems that shows abrupt changes...
The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits eve...
Abstract. We study upper and lower bounds on the kernel size for the 3-hitting set problem on hyperg...