English

Strong complete minors in digraphs

Combinatorics 2020-10-13 v1

Abstract

Kostochka and Thomason independently showed that any graph with average degree Ω(rlogr)\Omega(r\sqrt{\log r}) contains a KrK_r minor. In particular, any graph with chromatic number Ω(rlogr)\Omega(r\sqrt{\log r}) contains a KrK_r minor, a partial result towards Hadwiger's famous conjecture. In this paper, we investigate analogues of these results in the directed setting. There are several ways to define a minor in a digraph. One natural way is as follows. A strong Kr\overrightarrow{K}_r minor is a digraph whose vertex set is partitioned into rr parts such that each part induces a strongly-connected subdigraph, and there is at least one edge in each direction between any two distinct parts. We investigate bounds on the dichromatic number and minimum out-degree of a digraph that force the existence of strong Kr\overrightarrow{K}_r minors as subdigraphs. In particular, we show that any tournament with dichromatic number at least 2r2r contains a strong Kr\overrightarrow{K}_r minor, and any tournament with minimum out-degree Ω(rlogr)\Omega(r\sqrt{\log r}) also contains a strong Kr\overrightarrow{K}_r minor. The latter result is tight up to the implied constant, and may be viewed as a strong-minor analogue to the classical result of Kostochka and Thomason. Lastly, we show that there is no function f:NNf: \mathbb{N} \rightarrow \mathbb{N} such that any digraph with minimum out-degree at least f(r)f(r) contains a strong Kr\overrightarrow{K}_r minor, but such a function exists when considering dichromatic number.

Keywords

Cite

@article{arxiv.2010.05643,
  title  = {Strong complete minors in digraphs},
  author = {Maria Axenovich and António Girão and Richard Snyder and Lea Weber},
  journal= {arXiv preprint arXiv:2010.05643},
  year   = {2020}
}

Comments

17 pages

R2 v1 2026-06-23T19:16:31.012Z