Spanning trees in dense directed graphs

Abstract

In 2001, Koml\'os, S\'ark\"ozy and Szemer\'edi proved that, for each α>0, there is some c>0 and n0 such that, if n≥ n0, then every n-vertex graph with minimum degree at least (1/2+α)n contains a copy of every n-vertex tree with maximum degree at most cn/ n. We prove the corresponding result for directed graphs. That is, for each α>0, there is some c>0 and n0 such that, if n≥ n0, then every n-vertex directed graph with minimum semi-degree at least (1/2+α)n contains a copy of every n-vertex oriented tree whose underlying maximum degree is at most cn/ n. As with Koml\'os, S\'ark\"ozy and Szemer\'edi's theorem, this is tight up to the value of c. Our result improves a recent result of Mycroft and Naia, which requires the oriented trees to have underlying maximum degree at most , for any constant ∈ N and sufficiently large n. In contrast to these results, our methods do not use Szemer\'edi's regularity lemma.