No additional tournaments are quasirandom-forcing

Abstract

A tournament H is quasirandom-forcing if the following holds for every sequence (Gn) of tournaments of growing orders: if the density of H in Gn converges to the expected density of H in a random tournament, then (Gn) is quasirandom. Every transitive tournament with at least 4 vertices is quasirandom-forcing, and Coregliano et al. [Electron. J. Combin. 26 (2019), P1.44] showed that there is also a non-transitive 5-vertex tournament with the property. We show that no additional tournament has this property. This extends the result of Bucic et al. [Combinatorica 41 (2021), 175-208] that the non-transitive tournaments with seven or more vertices do not have this property.