English

Thoroughly Distributed Colorings

Combinatorics 2016-10-03 v1

Abstract

We consider (not necessarily proper) colorings of the vertices of a graph where every color is thoroughly distributed, that is, appears in every open neighborhood. Equivalently, every color is a total dominating set. We define \td(G)\td(G) as the maximum number of colors in such a coloring and \FTD(G)\FTD(G) as the fractional version thereof. In particular, we show that every claw-free graph with minimum degree at least~22 has~\FTD(G)3/2\FTD(G)\ge 3/2 and this is best possible. For planar graphs, we show that every triangular disc has \FTD(G)3/2\FTD(G) \ge 3/2 and this is best possible, and that every planar graph has \td(G)4\td(G) \le 4 and this is best possible, while we conjecture that every planar triangulation has \td(G)2\td(G)\ge 2. Further, although there are arbitrarily large examples of connected, cubic graphs with \td(G)=1\td(G)=1, we show that for a connected cubic graph \FTD(G)2o(1)\FTD(G) \ge 2-o(1), and conjecture that it is always at least~22. We also consider the related concepts in hypergraphs.

Keywords

Cite

@article{arxiv.1609.09684,
  title  = {Thoroughly Distributed Colorings},
  author = {Wayne Goddard and Michael A. Henning},
  journal= {arXiv preprint arXiv:1609.09684},
  year   = {2016}
}

Comments

26 pages

R2 v1 2026-06-22T16:06:31.051Z