Erdos-Hajnal-type results for ordered paths

Abstract

An ordered graph is a graph with a linear ordering on its vertex set. We prove that for every positive integer k, there exists a constant ck>0 such that any ordered graph G on n vertices with the property that neither G nor its complement contains an induced monotone path of size k, has either a clique or an independent set of size at least nck. This strengthens a result of Bousquet, Lagoutte, and Thomass\'e, who proved the analogous result for unordered graphs. A key idea of the above paper was to show that any unordered graph on n vertices that does not contain an induced path of size k, and whose maximum degree is at most c(k)n for some small c(k)>0, contains two disjoint linear size subsets with no edge between them. This approach fails for ordered graphs, because the analogous statement is false for k≥ 3, by a construction of Fox. We provide further examples how this statement fails for ordered graphs avoiding other ordered trees as well.