English

Counting oriented trees in digraphs with large minimum semidegree

Combinatorics 2024-07-25 v2

Abstract

Let TT be an oriented tree on nn vertices with maximum degree at most eo(logn)e^{o(\sqrt{\log n})}. If GG is a digraph on nn vertices with minimum semidegree δ0(G)(12+o(1))n\delta^0(G)\geq(\frac12+o(1))n, then GG contains TT as a spanning tree, as recently shown by Kathapurkar and Montgomery (in fact, they only require maximum degree o(n/logn)o(n/\log 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 TT the digraph GG contains. Our main result states that every such GG contains at least Aut(T)1(12o(1))nn!|Aut(T)|^{-1}(\frac12-o(1))^nn! copies of TT, which is optimal. This implies the analogous result in the undirected case.

Keywords

Cite

@article{arxiv.2305.15101,
  title  = {Counting oriented trees in digraphs with large minimum semidegree},
  author = {Felix Joos and Jonathan Schrodt},
  journal= {arXiv preprint arXiv:2305.15101},
  year   = {2024}
}

Comments

24 pages

R2 v1 2026-06-28T10:44:31.830Z