A star-comb lemma for finite digraphs
Abstract
It is well-known that for every set U of vertices in a connected graph G there is either a subdivided star in G with a large number of leaves in U, or a comb in G with a large number of teeth in U. In this paper we extend this property to directed graphs. More precisely, we prove that for every n ∈ N and every sufficiently large set U of vertices in a strongly connected directed graph D, there exists a strongly connected butterfly minor of D with n teeth in U that is either shaped by a star or shaped by a comb.
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