On the ubiquity of oriented double rays
Abstract
A digraph H is called ubiquitous if every digraph that contains arbitrarily many vertex-disjoint copies of H also contains infinitely many vertex-disjoint copies of H. We study oriented double rays, that is, digraphs H whose underlying undirected graphs are double rays. Calling a vertex of an oriented double ray a turn if it has in-degree or out-degree 2, we prove that an oriented double ray with at least one turn is ubiquitous if and only if it has a (finite) odd number of turns. It remains an open problem to determine whether the consistently oriented double ray is ubiquitous.
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