A tight Erdos-P\'osa function for wheel minors

Abstract

Let Wt denote the wheel on t+1 vertices. We prove that for every integer t ≥ 3 there is a constant c=c(t) such that for every integer k≥ 1 and every graph G, either G has k vertex-disjoint subgraphs each containing Wt as minor, or there is a subset X of at most c k k vertices such that G-X has no Wt minor. This is best possible, up to the value of c. We conjecture that the result remains true more generally if we replace Wt with any fixed planar graph H.