The Erdos-P\'osa property for circle graphs as vertex-minors

Abstract

We prove that for any circle graph H with at least one edge and for any positive integer k, there exists an integer t=t(k,H) so that every graph G either has a vertex-minor isomorphic to the disjoint union of k copies of H, or has a t-perturbation with no vertex-minor isomorphic to H. Using the same techniques, we also prove that for any planar multigraph H, every binary matroid either has a minor isomorphic to the cycle matroid of kH, or is a low-rank perturbation of a binary matroid with no minor isomorphic to the cycle matroid of H.