Quasi-Carousel Tournaments

Abstract

A tournament is called locally transitive if the outneighbourhood and the inneighbourhood of every vertex are transitive. Equivalently, a tournament is locally transitive if it avoids the tournaments W4 and L4, which are the only tournaments up to isomorphism on four vertices containing a unique 3-cycle. On the other hand, a sequence of tournaments (Tn)n∈N with |V(Tn)| = n is called almost balanced if all but o(n) vertices of Tn have outdegree (1/2 + o(1))n. In the same spirit of quasi-random properties, we present several characterizations of tournament sequences that are both almost balanced and asymptotically locally transitive in the sense that the density of W4 and L4 in Tn goes to zero as n goes to infinity.