Algorithmic Properties of Sparse Digraphs
Abstract
The notions of bounded expansion and nowhere denseness have been applied very successfully in algorithmic graph theory. We study the corresponding notions of directed bounded expansion and nowhere crownfulness on directed graphs. We show that many of the algorithmic tools that were developed for undirected bounded expansion classes can, with some care, also be applied in their directed counterparts, and thereby we highlight a rich algorithmic structure theory of directed bounded expansion classes. More specifically, we show that the directed Steiner tree problem is fixed-parameter tractable on any class of directed bounded expansion parameterized by the number of non-terminals plus the maximal diameter of a strongly connected component in the subgraph induced by the terminals. Our result strongly generalizes a result of Jones et al., who proved that the problem is fixed parameter tractable on digraphs of bounded degeneracy if the set of terminals is required to be acyclic. We furthermore prove that for every integer , the distance- dominating set problem can be approximated up to a factor and the connected distance- dominating set problem can be approximated up to a factor on any class of directed bounded expansion, where denotes the size of an optimal solution. If furthermore, the class is nowhere crownful, we are able to compute a polynomial kernel for distance- dominating sets. Polynomial kernels for this problem were not known to exist on any other existing digraph measure for sparse classes.
Cite
@article{arxiv.1707.01701,
title = {Algorithmic Properties of Sparse Digraphs},
author = {Stephan Kreutzer and Patrice Ossona de Mendez and Roman Rabinovich and Sebastian Siebertz},
journal= {arXiv preprint arXiv:1707.01701},
year = {2017}
}