English

The Erdos-Posa Property for Directed Graphs

Discrete Mathematics 2016-03-15 v3 Combinatorics

Abstract

A classical result by Erdos and Posa states that there is a function f:NNf: {\mathbb N} \rightarrow {\mathbb N} such that for every kk, every graph GG contains kk pairwise vertex disjoint cycles or a set TT of at most f(k)f(k) vertices such that GTG-T 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 HH has the Erdos-Posa-property if, and only if, HH 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}
}
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