Pure pairs. VIII. Excluding a sparse graph
Abstract
A pure pair of size in a graph is a pair of disjoint sets of vertices such that is either complete or anticomplete to . It is known that, for every forest , every graph on vertices that does not contain or its complement as an induced subgraph has a pure pair of size ; furthermore, this only holds when or its complement is a forest. In this paper, we look at pure pairs of size , where . Let be a graph: does every graph on vertices that does not contain or its complement as an induced subgraph have a pure pair with ,? The answer is related to the congestion of , the maximum of over all subgraphs of with an edge. (Congestion is nonnegative, and equals zero exactly when is a forest.) Let be the smaller of the congestions of and . We show that the answer to the question above is "yes" if , and "no" if .
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}
}