Erd\"os-P\'osa property of minor-models with prescribed vertex sets

Abstract

A minor-model of a graph H in a graph G is a subgraph of G that can be contracted to H. We prove that for a positive integer and a non-empty planar graph H with at least -1 connected components, there exists a function fH, :N→ R satisfying the property that every graph G with a family of vertex subsets Z1, …, Zm contains either k pairwise vertex-disjoint minor-models of H each intersecting at least sets among prescribed vertex sets, or a vertex subset of size at most fH, (k) that meets all such minor-models of H. This function fH, is independent with the number m of given sets, and thus, our result generalizes Mader's S-path Theorem, by applying =2 and H to be the one-vertex graph. We prove that such a function fH, does not exist if H consists of at most -2 connected components.