Sparse graphs with no polynomial-sized anticomplete pairs
Abstract
A graph is "-free" if it has no induced subgraph isomorphic to . A conjecture of Conlon, Fox and Sudakov states that for every graph , there exists such that in every -free graph with vertices, either some vertex has degree at least , or there are two disjoint sets of vertices, of sizes at least and , anticomplete to each other. We prove this holds for a large class of graphs , and we prove that something like it holds for all graphs . Say is "almost-bipartite" if is triangle-free and can be partitioned into a stable set and a set inducing a graph of maximum degree at most one. We prove that the conjecture above holds for when is almost-bipartite. We also prove a stronger version where instead of excluding we restrict the number of copies of . We prove some variations on the conjecture, such as: for every graph , there exists such that in every -free graph with vertices, either some vertex has degree at least , or there are two disjoint sets of vertices with , anticomplete to each other.
Cite
@article{arxiv.1810.00058,
title = {Sparse graphs with no polynomial-sized anticomplete pairs},
author = {Maria Chudnovsky and Jacob Fox and Alex Scott and Paul Seymour and Sophie Spirkl},
journal= {arXiv preprint arXiv:1810.00058},
year = {2020}
}