English

Colouring Lines in Projective Space

Combinatorics 2007-05-23 v1

Abstract

Let VV be a vector space of dimension vv over a field of order qq. The qq-Kneser graph has the kk-dimensional subspaces of VV as its vertices, where two subspaces α\alpha and β\beta are adjacent if and only if αβ\alpha\cap\beta is the zero subspace. This paper is motivated by the problem of determining the chromatic numbers of these graphs. This problem is trivial when k=1k=1 (and the graphs are complete) or when v<2kv<2k (and the graphs are empty). We establish some basic theory in the general case. Then specializing to the case k=2k=2, we show that the chromatic number is q2+qq^2+q when v=4v=4 and (qv11)/(q1)(q^{v-1}-1)/(q-1) when v>4v > 4. In both cases we characterise the minimal colourings.

Keywords

Cite

@article{arxiv.math/0507319,
  title  = {Colouring Lines in Projective Space},
  author = {Ameera Chowdhury and Chris Godsil and Gordon Royle},
  journal= {arXiv preprint arXiv:math/0507319},
  year   = {2007}
}

Comments

19 pages; to appear in J. Combinatorial Theory, Series A