English

Covering 2-colored complete digraphs by monochromatic $d$-dominating digraphs

Combinatorics 2021-02-26 v1

Abstract

A digraph is {\em dd-dominating} if every set of at most dd vertices has a common out-neighbor. For all integers d2d\geq 2, let f(d)f(d) be the smallest integer such that the vertices of every 2-edge-colored (finite or infinite) complete digraph (including loops) can be covered by the vertices of at most f(d)f(d) monochromatic dd-dominating subgraphs. Note that the existence of f(d)f(d) is not obvious -- indeed, the question which motivated this paper was simply to determine whether f(d)f(d) is bounded, even for d=2d=2. We answer this question affirmatively for all d2d\geq 2, proving 4f(2)84\leq f(2)\le 8 and 2df(d)2d(dd1d1)2d\leq f(d)\le 2d\left(\frac{d^{d}-1}{d-1}\right) for all d3d\ge 3. We also give an example to show that there is no analogous bound for more than two colors. Our result provides a positive answer to a question regarding an infinite analogue of the Burr-Erd\H{o}s conjecture on the Ramsey numbers of dd-degenerate graphs. Moreover, a special case of our result is related to properties of dd-paradoxical tournaments.

Keywords

Cite

@article{arxiv.2102.12794,
  title  = {Covering 2-colored complete digraphs by monochromatic $d$-dominating digraphs},
  author = {Louis DeBiasio and András Gyárfás},
  journal= {arXiv preprint arXiv:2102.12794},
  year   = {2021}
}

Comments

7 pages

R2 v1 2026-06-23T23:30:05.855Z