English

Separation dimension of sparse graphs

Combinatorics 2014-04-18 v1 Discrete Mathematics

Abstract

The separation dimension of a graph GG is the smallest natural number kk for which the vertices of GG can be embedded in Rk\mathbb{R}^k such that any pair of disjoint edges in GG can be separated by a hyperplane normal to one of the axes. Equivalently, it is the smallest possible cardinality of a family F\mathcal{F} of permutations of the vertices of GG such that for any two disjoint edges of GG, there exists at least one permutation in F\mathcal{F} in which all the vertices in one edge precede those in the other. In general, the maximum separation dimension of a graph on nn vertices is Θ(logn)\Theta(\log n). In this article, we focus on sparse graphs and show that the maximum separation dimension of a kk-degenerate graph on nn vertices is O(kloglogn)O(k \log\log n) and that there exists a family of 22-degenerate graphs with separation dimension Ω(loglogn)\Omega(\log\log n). We also show that the separation dimension of the graph G1/2G^{1/2} obtained by subdividing once every edge of another graph GG is at most (1+o(1))loglogχ(G)(1 + o(1)) \log\log \chi(G) where χ(G)\chi(G) is the chromatic number of the original graph.

Keywords

Cite

@article{arxiv.1404.4484,
  title  = {Separation dimension of sparse graphs},
  author = {Manu Basavaraju and L. Sunil Chandran and Rogers Mathew and Deepak Rajendraprasad},
  journal= {arXiv preprint arXiv:1404.4484},
  year   = {2014}
}

Comments

This is the full version of a paper to be presented at ICGT 2014. This is a subset of the results in arXiv:1212.6756

R2 v1 2026-06-22T03:52:54.707Z