The indecomposable tournaments T with W5(T) = T -2

Abstract

We consider a tournament T=(V, A). For X⊂eq V, the subtournament of T induced by X is T[X] = (X, A (X × X)). An interval of T is a subset X of V such that for a, b∈ X and x∈ V X, (a,x)∈ A if and only if (b,x)∈ A. The trivial intervals of T are , \x\(x∈ V) and V. A tournament is indecomposable if all its intervals are trivial. For n≥ 2, W2n+1 denotes the unique indecomposable tournament defined on \0,…,2n\ such that W2n+1[\0,…,2n-1\] is the usual total order. Given an indecomposable tournament T, W5(T) denotes the set of v∈ V such that there is W⊂eq V satisfying v∈ W and T[W] is isomorphic to W5. Latka BJL characterized the indecomposable tournaments T such that W5(T)=. The authors HIK proved that if W5(T)≠ , then W5(T) ≥ V -2. In this article, we characterize the indecomposable tournaments T such that W5(T) = V -2.