English

Pure pairs. VIII. Excluding a sparse graph

Combinatorics 2023-10-31 v2

Abstract

A pure pair of size tt in a graph GG is a pair A,BA,B of disjoint sets of tt vertices such that AA is either complete or anticomplete to BB. It is known that, for every forest HH, every graph on n2n\ge2 vertices that does not contain HH or its complement as an induced subgraph has a pure pair of size Ω(n)\Omega(n); furthermore, this only holds when HH or its complement is a forest. In this paper, we look at pure pairs of size n1cn^{1-c}, where 0<c<10<c<1. Let HH be a graph: does every graph on n2n\ge2 vertices that does not contain HH or its complement as an induced subgraph have a pure pair A,BA,B with A,BΩ(G1c)|A|,|B|\ge \Omega(|G|^{1-c}),? The answer is related to the congestion of HH, the maximum of 1(J1)/E(J)1-(|J|-1)/|E(J)| over all subgraphs JJ of HH with an edge. (Congestion is nonnegative, and equals zero exactly when HH is a forest.) Let dd be the smaller of the congestions of HH and H\overline{H}. We show that the answer to the question above is "yes" if dc/(9+15c)d\le c/(9+15c), and "no" if d>cd>c.

Keywords

Cite

@article{arxiv.2201.04062,
  title  = {Pure pairs. VIII. Excluding a sparse graph},
  author = {Alex Scott and Paul Seymour and Sophie Spirkl},
  journal= {arXiv preprint arXiv:2201.04062},
  year   = {2023}
}
R2 v1 2026-06-24T08:46:42.595Z