Large unavoidable subtournaments

Abstract

Let Dk denote the tournament on 3k vertices consisting of three disjoint vertex classes V1, V2 and V3 of size k, each of which is oriented as a transitive subtournament, and with edges directed from V1 to V2, from V2 to V3 and from V3 to V1. Fox and Sudakov proved that given a natural number k and ε > 0 there is n0(k,ε ) such that every tournament of order n0(k,ε ) which is ε -far from being transitive contains Dk as a subtournament. Their proof showed that n0(k,ε ) ≤ ε -O(k/ε 2) and they conjectured that this could be reduced to n0(k,ε ) ≤ ε -O(k). Here we prove this conjecture.