Pure pairs. V. Excluding some long subdivision

Abstract

A pure pair in a graph G is a pair A,B of disjoint subsets of V(G) such that A is complete or anticomplete to B. Jacob Fox showed that for all ε>0, there is a comparability graph G with n vertices, where n is large, in which there is no pure pair A,B with |A|,|B| ε n. He also proved that for all c>0 there exists ε>0 such that for every comparability graph G with n>1 vertices, there is a pure pair A,B with |A|,|B| ε n1-c; and conjectured that the same holds for every perfect graph G. We prove this conjecture and strengthen it in several ways. In particular, we show that for all c>0, and all 1, 2 4c-1+9, there exists ε>0 such that, if G is a graph with n>1 vertices and no hole of length exactly 1 and no antihole of length exactly 2, then there is a pure pair A,B in G with |A| ε n and |B| ε n1-c. This is further strengthened, replacing excluding a hole by excluding some long subdivision of a general graph.