Obstructions to Erdos-P\'osa Dualities for Minors
Abstract
Let G and H be minor-closed graph classes. The pair ( H, G) is an Erdos-P\'osa pair (EP-pair) if there is a function f where, for every k and every G∈ G, either G has k pairwise vertex-disjoint subgraphs not belonging to H, or there is a set S⊂eq V(G) where |S|≤ f(k) and G-S∈ H. The classic result of Erdos and P\'osa says that if F is the class of forests, then ( F, G) is an EP-pair for every G. The class G is an EP-counterexample for H if G is minimal with the property that ( H, G) is not an EP-pair. We prove that for every H the set C H of all EP-counterexamples for H is finite. In particular, we provide a complete characterization of C H for every H and give a constructive upper bound on its size. Each class G∈ C H can be described as all minors of a sequence of grid-like graphs Wk k∈ N. Moreover, each Wk admits a half-integral packing: k copies of some H∈ H where no vertex is used more than twice. This gives a complete delineation of the half-integrality threshold of the Erdos-P\'osa property for minors and yields a constructive proof of Thomas' conjecture on the half-integral Erdos-P\'osa property for minors (recently confirmed, non-constructively, by Liu). Let h be the maximum size of a graph in H. For every class H, we construct an algorithm that, given a graph G and a k, either outputs a half-integral packing of k copies of some H ∈ H or outputs a set of at most 2k Oh(1) vertices whose deletion creates a graph in H in time 22k Oh(1)· |G|4 |G|.
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