Schuttes property for sets of tournaments and an application to dice games

Abstract

A tournament has Schuttes property Sk if for every set of k vertices, there is a vertex which dominates the set. In 1963, Erdos provided bounds for f(k), the smallest order of an Sk tournament. Schuttes property has various applications, including the design of unfair dice games. A set of dice introduced by James Grime motivates a generalization of Schuttes property to sets of tournaments: a set of tournaments on the same vertex set has property Sk if for every set of k vertices, there is a vertex which dominates the set in at least one of the tournaments. We explore this generalization and provide bounds on the fewest number of vertices needed to have an Sk set of m tournaments. We then apply these results to introduce a few new sets of dice similar to Grimes dice that can be used to play a game that gives one player an advantage.