Unavoidable subgraphs in digraphs with large out-degrees

Abstract

We ask the question, which oriented trees T must be contained as subgraphs in every finite directed graph of sufficiently large minimum out-degree. We formulate the following simple condition: all vertices in T of in-degree at least 2 must be on the same 'level' in the natural height function of T. We prove this condition to be necessary and conjecture it to be sufficient. In support of our conjecture, we prove it for a fairly general class of trees. An essential tool in the latter proof, and a question interesting in its own right, is finding large subdivided in-stars in a directed graph of large minimum out-degree. We conjecture that any digraph and oriented graph of minimum out-degree at least k and k/2, respectively, contains the (k-1)-subdivision of the in-star with leaves as a subgraph; this would be tight and generalizes a conjecture of Thomass\'e. We prove this for digraphs and k=2 up to a factor of less than 2.

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