Every (13k-6)-strong tournament with minimum out-degree at least 28k-13 is k-linked

Abstract

A digraph D is k-linked if it satisfies that for every choice of disjoint sets \x1,…,xk\ and \y1,…,yk\ of vertices of D there are vertex disjoint paths P1,…,Pk such that Pi is an (xi,yi)-path. Confirming a conjecture by K\"uhn et al, Pokrovskiy proved in 2015 that every 452k-strong tournament is k-linked and asked for a better linear bound. Very recently Meng et al proved that every (40k-31)-strong tournament is k-linked. In this note we use an important lemma from their paper to give a short proof that every (13k-6)-strong tournament of minimum out-degree at least 28k-13 is k-linked.