Counting oriented trees in digraphs with large minimum semidegree

Abstract

Let T be an oriented tree on n vertices with maximum degree at most eo( n). If G is a digraph on n vertices with minimum semidegree δ0(G)≥(12+o(1))n, then G contains T as a spanning tree, as recently shown by Kathapurkar and Montgomery (in fact, they only require maximum degree o(n/ n)). This generalizes the corresponding result by Koml\'os, S\'ark\"ozy and Szemer\'edi for graphs. We investigate the natural question how many copies of T the digraph G contains. Our main result states that every such G contains at least |Aut(T)|-1(12-o(1))nn! copies of T, which is optimal. This implies the analogous result in the undirected case.