The second out-neighbourhood for local tournaments

Abstract

Sullivan stated the conjectures: (1) every oriented graph D has a vertex x such that d++(x)≥ d-(x); (2) every oriented graph D has a vertex x such that d++(x)+d+(x)≥ 2d-(x). In this paper, we prove that these conjectures hold for local tournaments. In particular, for a local tournament D, we prove that D has at least two vertices satisfying (1) if D has no vertex of in-degree zero. And, for a local tournament D, we prove that either there exist two vertices satisfying (2) or there exists a vertex v satisfying d++(v)+d+(v)≥ 2d-(v)+2 if D has no vertex of in-degree zero.