English

Improved Ramsey-type results for comparability graphs

Combinatorics 2020-10-14 v2

Abstract

Several discrete geometry problems are equivalent to estimating the size of the largest homogeneous sets in graphs that happen to be the union of few comparability graphs. An important observation for such results is that if GG is an nn-vertex graph that is the union of rr comparability (or more generally, perfect) graphs, then either GG or its complement contains a clique of size n1/(r+1)n^{1/(r+1)}. This bound is known to be tight for r=1r=1. The question whether it is optimal for r2r\ge 2 was studied by Dumitrescu and T\'oth. We prove that it is essentially best possible for r=2r=2, as well: we introduce a probabilistic construction of two comparability graphs on nn vertices, whose union contains no clique or independent set of size n1/3+o(1)n^{1/3+o(1)}. Using similar ideas, we can also construct a graph GG that is the union of rr comparability graphs, and neither GG, nor its complement contains a complete bipartite graph with parts of size cn(logn)r\frac{cn}{(\log n)^r}. With this, we improve a result of Fox and Pach.

Keywords

Cite

@article{arxiv.1810.00588,
  title  = {Improved Ramsey-type results for comparability graphs},
  author = {Dániel Korándi and István Tomon},
  journal= {arXiv preprint arXiv:1810.00588},
  year   = {2020}
}

Comments

11 pages, 1 figure

R2 v1 2026-06-23T04:24:02.501Z