Motivated by the need for succinct representations of all "small" transversals (or hitting sets) of a hypergraph of fixed rank, we study the complexity of computing such a representation. Next, the existence of a minimal hitting set of at least a given size arises as a subproblem. We give one algorithm for hypergraphs of any fixed rank, and we largely improve an earlier algorithm (by H. Fernau, 2005) for the rank-2 case, i.e., for computing a minimal vertex cover of at least a given size in a graph. We were led to these questions by combinatorial aspects of the protein inference problem in shotgun proteomics
In this paper, we consider the minimum unweighted Vertex Cover problem with Hard Capacity constraint...
This thesis focuses on graphs, hypergraphs, and lattices. We study the complexity of the dualization...
We study parameterized enumeration problems where we are interested in all solutions of limited size...
Motivated by the need for succinct representations of all "small" transversals (or hitting sets) of ...
AbstractMotivated by the need for succinct representations of all “small” transversals (or hitting s...
AbstractWe consider the Minimum Vertex Cover problem in hypergraphs in which every hyperedge has siz...
A k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedges. We st...
Hypergraph Dualization (also called as hitting set enumeration) is the problem of enumerating all mi...
AbstractA k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedge...
We study how many vertices in a rank-r hypergraph can belong to the union of all inclusion-minimal h...
The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits eve...
We introduce the problem Partial VC Dimension that asks, given a hypergraph H = (X, E)and integers k...
AbstractGiven a finite set V, and a hypergraph H⊆2V, the hypergraph transversal problem calls for en...
We study parameterized enumeration problems where we are interested in all solutions of limited size...
AbstractWe study parameterized enumeration problems where we are interested in all solutions of limi...
In this paper, we consider the minimum unweighted Vertex Cover problem with Hard Capacity constraint...
This thesis focuses on graphs, hypergraphs, and lattices. We study the complexity of the dualization...
We study parameterized enumeration problems where we are interested in all solutions of limited size...
Motivated by the need for succinct representations of all "small" transversals (or hitting sets) of ...
AbstractMotivated by the need for succinct representations of all “small” transversals (or hitting s...
AbstractWe consider the Minimum Vertex Cover problem in hypergraphs in which every hyperedge has siz...
A k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedges. We st...
Hypergraph Dualization (also called as hitting set enumeration) is the problem of enumerating all mi...
AbstractA k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedge...
We study how many vertices in a rank-r hypergraph can belong to the union of all inclusion-minimal h...
The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits eve...
We introduce the problem Partial VC Dimension that asks, given a hypergraph H = (X, E)and integers k...
AbstractGiven a finite set V, and a hypergraph H⊆2V, the hypergraph transversal problem calls for en...
We study parameterized enumeration problems where we are interested in all solutions of limited size...
AbstractWe study parameterized enumeration problems where we are interested in all solutions of limi...
In this paper, we consider the minimum unweighted Vertex Cover problem with Hard Capacity constraint...
This thesis focuses on graphs, hypergraphs, and lattices. We study the complexity of the dualization...
We study parameterized enumeration problems where we are interested in all solutions of limited size...