On the Erdos-P\'osa property for immersions and topological minors in tournaments

Abstract

We consider the Erdos-P\'osa property for immersions and topological minors in tournaments. We prove that for every simple digraph H, k∈ N, and tournament T, the following statements hold: (i) If in T one cannot find k arc-disjoint immersion copies of H, then there exists a set of OH(k3) arcs that intersects all immersion copies of H in T. (ii) If in T one cannot find k vertex-disjoint topological minor copies of H, then there exists a set of OH(k k) vertices that intersects all topological minor copies of H in T. This improves the results of Raymond [DMTCS '18], who proved similar statements under the assumption that H is strongly connected.

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