The Erdos-Posa Property for Directed Graphs
Abstract
A classical result by Erdos and Posa states that there is a function such that for every , every graph contains pairwise vertex disjoint cycles or a set of at most vertices such that is acyclic. The generalisation of this result to directed graphs is known as Younger's conjecture and was proved by Reed, Robertson, Seymour and Thomas in 1996. This so-called Erdos-Posa-property can naturally be generalised to arbitrary graphs and digraphs. Robertson and Seymour proved that a graph has the Erdos-Posa-property if, and only if, is planar. In this paper we study the corresponding problem for digraphs. We obtain a complete characterisation of the class of strongly connected digraphs which have the Erdos-Posa-property (both for topological and butterfly minors). We also generalise this result to classes of digraphs which are not strongly connected. In particular, we study the class of vertex-cyclic digraphs (digraphs without trivial strong components). For this natural class of digraphs we obtain a nearly complete characterisation of the digraphs within this class with the Erdos-Posa-property. In particular we give positive and algorithmic examples of digraphs with the Erdos-Posa-property by using directed tree decompositions in a novel way.
Keywords
Cite
@article{arxiv.1603.02504,
title = {The Erdos-Posa Property for Directed Graphs},
author = {Saeed Akhoondian Amiri and Ken-Ichi Kawarabayashi and Stephan Kreutzer and Paul Wollan},
journal= {arXiv preprint arXiv:1603.02504},
year = {2016}
}