Trees and treelike structures in dense digraphs
Abstract
We prove that every oriented tree on n vertices with bounded maximum degree appears as a spanning subdigraph of every directed graph on n vertices with minimum semidegree at least n/2+o(n). This can be seen as a directed graph analogue of a well-known theorem of Komlós, Sárközy and Szemerédi. Our result for trees follows from a more general result, allowing the embedding of arbitrary orientations of a much wider class of spanning ``tree-like'' structures, such as collections of at most O(n0.99) pairwise vertex-disjoint cycles and subdivisions of graphs H with |H| < (O( n)) in which each edge is subdivided at least once.
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