Polynomial Gap Extensions of the Erdos-P\'osa Theorem

Abstract

Given a graph H, we denote by M(H) all graphs that can be contracted to H. The following extension of the Erdos-P\'osa Theorem holds: for every h-vertex planar graph H, there exists a function fH such that every graph G, either contains k disjoint copies of graphs in M(H), or contains a set of fH(k) vertices meeting every subgraph of G that belongs in M(H). In this paper we prove that this is the case for every graph H of pathwidth at most 2 and, in particular, that fH(k) = 2O(h2)· k2· k. As a main ingredient of the proof of our result, we show that for every graph H on h vertices and pathwidth at most 2, either G contains k disjoint copies of H as a minor or the treewidth of G is upper-bounded by 2O(h2)· k2· k. We finally prove that the exponential dependence on h in these bounds can be avoided if H=K2,r. In particular, we show that fK2,r=O(r2· k2)