English

Proper orientations and proper chromatic number

Combinatorics 2022-12-09 v2

Abstract

The proper chromatic number \Vecχ(G)\Vec{\chi}(G) of a graph GG is the minimum kk such that there exists an orientation of the edges of GG with all vertex-outdegrees at most kk and such that for any adjacent vertices, the outdegrees are different. Two major conjectures about the proper chromatic number are resolved. First it is shown, that \Vecχ(G)\Vec{\chi}(G) of any planar graph GG is bounded (in fact, it is at most 14). Secondly, it is shown that for every graph, \Vecχ(G)\Vec{\chi}(G) is at most O(rlogrloglogr)+12\MAD(G)O(\frac{r\log r}{\log\log r})+\tfrac{1}{2}\MAD(G), where r=χ(G)r=\chi(G) is the usual chromatic number of the graph, and \MAD(G)\MAD(G) is the maximum average degree taken over all subgraphs of GG. Several other related results are derived. Our proofs are based on a novel notion of fractional orientations.

Keywords

Cite

@article{arxiv.2110.07005,
  title  = {Proper orientations and proper chromatic number},
  author = {Yaobin Chen and Bojan Mohar and Hehui Wu},
  journal= {arXiv preprint arXiv:2110.07005},
  year   = {2022}
}
R2 v1 2026-06-24T06:52:19.545Z