English

Dichromatic number and forced subdivisions

Combinatorics 2020-08-25 v1

Abstract

We investigate bounds on the dichromatic number of digraphs which avoid a fixed digraph as a topological minor. For a digraph FF, denote by maderχ(F)\text{mader}_{\vec{\chi}}(F) the smallest integer kk such that every kk-dichromatic digraph contains a subdivision of FF. As our first main result, we prove that if FF is an orientation of a cycle then maderχ(F)=v(F)\text{mader}_{\vec{\chi}}(F)=v(F). This settles a conjecture of Aboulker, Cohen, Havet, Lochet, Moura and Thomass\'{e}. We also extend this result to the more general class of orientations of cactus graphs, and to bioriented forests. Our second main result is that maderχ(F)=4\text{mader}_{\vec{\chi}}(F)=4 for every tournament FF of order 44. This is an extension of the classical result by Dirac that 44-chromatic graphs contain a K4K_4-subdivision to directed graphs.

Keywords

Cite

@article{arxiv.2008.09888,
  title  = {Dichromatic number and forced subdivisions},
  author = {Lior Gishboliner and Raphael Steiner and Tibor Szabó},
  journal= {arXiv preprint arXiv:2008.09888},
  year   = {2020}
}

Comments

24 pages, 1 figure

R2 v1 2026-06-23T18:02:22.940Z