Generalized Intransitive Dice II: Partition Constructions

Abstract

A generalized N-sided die is a random variable D on a sample space of N equally likely outcomes taking values in the set of positive integers. We say of independent N sided dice Di, Dj that Di beats Dj, written Di Dj, if Prob(Di > Dj) > 12 . A collection of dice \ Di : i = 1, …, n \ models a tournament on the set [n] = \ 1, 2, …, n \, i.e. a complete digraph with n vertices, when Di Dj if and only if i j in the tournament. By using n-fold partitions of the set [Nn] with each set of size N we can model an arbitrary tournament on [n]. A bound on the required size of N is obtained by examples with N = 3n-2.