Hamiltonian Cycles Avoiding Prescribed Arcs in Tournaments

Abstract

Thomassen [6] conjectured that if I is a set of k−1 arcs in a k-strong tournament T, then T−I has a Hamiltonian cycle. This conjecture was proved by Fraisse and Thomassen [3]. We prove the following stronger result. Let T=(V, A) be a k-strong tournament on n vertices and let X₁, X₂, [ctdot ], X_l be a partition of the vertex set V of T such that [mid ]X₁[mid ][les ][mid ]X₂[mid ] [les ][ctdot ][les ][mid ]X_l[mid ]. If k[ges ][sum ] ^l−1_i=1[lfloor ] [mid ]X_i[mid ]/2[rfloor ]+[mid ]X_l[mid ], then T−∪^l_i=1 {xy∈A[ratio ]x, y∈X_i} has a Hamiltonian cycle. The bound on k is sharp.