English

Colouring Complete Multipartite and Kneser-type Digraphs

Combinatorics 2025-04-22 v2

Abstract

The dichromatic number of a digraph DD is the smallest kk such that DD can be partitioned into kk acyclic subdigraphs, and the dichromatic number of an undirected graph is the maximum dichromatic number over all its orientations. Extending a well-known result of Lov\'{a}sz, we show that the dichromatic number of the Kneser graph KG(n,k)KG(n,k) is Θ(n2k+2)\Theta(n-2k+2) and that the dichromatic number of the Borsuk graph BG(n+1,a)BG(n+1,a) is n+2n+2 if aa is large enough. We then study the list version of the dichromatic number. We show that, for any ε>0\varepsilon>0 and 2kn1/2ε2\leq k\leq n^{1/2-\varepsilon}, the list dichromatic number of KG(n,k)KG(n,k) is Θ(nlnn)\Theta(n\ln n). This extends a recent result of Bulankina and Kupavskii on the list chromatic number of KG(n,k)KG(n,k), where the same behaviour was observed. We also show that for any ρ>3\rho>3, r2r\geq 2 and mmax{lnρr,2}m\geq\max\{\ln^{\rho}r,2\}, the list dichromatic number of the complete rr-partite graph with mm vertices in each part is Θ(rlnm)\Theta(r\ln m), extending a classical result of Alon. Finally, we give a directed analogue of Sabidussi's theorem on the chromatic number of graph products.

Keywords

Cite

@article{arxiv.2309.16565,
  title  = {Colouring Complete Multipartite and Kneser-type Digraphs},
  author = {Ararat Harutyunyan and Gil Puig i Surroca},
  journal= {arXiv preprint arXiv:2309.16565},
  year   = {2025}
}

Comments

16 pages; minor corrections, updated references, added note at the end of Section 4

R2 v1 2026-06-28T12:35:07.184Z