Kernels for Below-Upper-Bound Parameterizations of the Hitting Set and Directed Dominating Set Problems
Abstract
In the {\sc Hitting Set} problem, we are given a collection of subsets of a ground set and an integer , and asked whether has a -element subset that intersects each set in . We consider two parameterizations of {\sc Hitting Set} below tight upper bounds: and . In both cases is the parameter. We prove that the first parameterization is fixed-parameter tractable, but has no polynomial kernel unless coNPNP/poly. The second parameterization is W[1]-complete, but the introduction of an additional parameter, the degeneracy of the hypergraph , makes the problem not only fixed-parameter tractable, but also one with a linear kernel. Here the degeneracy of is the minimum integer such that for each the hypergraph with vertex set and edge set containing all edges of without vertices in , has a vertex of degree at most In {\sc Nonblocker} ({\sc Directed Nonblocker}), we are given an undirected graph (a directed graph) on vertices and an integer , and asked whether has a set of vertices such that for each vertex there is an edge (arc) from a vertex in to . {\sc Nonblocker} can be viewed as a special case of {\sc Directed Nonblocker} (replace an undirected graph by a symmetric digraph). Dehne et al. (Proc. SOFSEM 2006) proved that {\sc Nonblocker} has a linear-order kernel. We obtain a linear-order kernel for {\sc Directed Nonblocker}.
Cite
@article{arxiv.1010.5881,
title = {Kernels for Below-Upper-Bound Parameterizations of the Hitting Set and Directed Dominating Set Problems},
author = {Gregory Gutin and Mark Jones and Anders Yeo},
journal= {arXiv preprint arXiv:1010.5881},
year = {2011}
}