English

Exact distance coloring in trees

Combinatorics 2019-03-18 v2

Abstract

For an integer q2q\ge 2 and an even integer dd, consider the graph obtained from a large complete qq-ary tree by connecting with an edge any two vertices at distance exactly dd in the tree. This graph has clique number q+1q+1, and the purpose of this short note is to prove that its chromatic number is Θ(dlogqlogd)\Theta\big(\tfrac{d \log q}{\log d}\big). It was not known that the chromatic number of this graph grows with dd. As a simple corollary of our result, we give a negative answer to a problem of van den Heuvel and Naserasr, asking whether there is a constant CC such that for any odd integer dd, any planar graph can be colored with at most CC colors such that any pair of vertices at distance exactly dd have distinct colors. Finally, we study interval coloring of trees (where vertices at distance at least dd and at most cdcd, for some real c>1c>1, must be assigned distinct colors), giving a sharp upper bound in the case of bounded degree trees.

Keywords

Cite

@article{arxiv.1703.06047,
  title  = {Exact distance coloring in trees},
  author = {Nicolas Bousquet and Louis Esperet and Ararat Harutyunyan and Rémi de Joannis de Verclos},
  journal= {arXiv preprint arXiv:1703.06047},
  year   = {2019}
}

Comments

9 pages, 2 figures - revised version

R2 v1 2026-06-22T18:48:55.200Z