Revisiting Dice Relabeling using Cyclotomic Polynomials

Abstract

We continue the exploration of a question of dice relabeling posed by Gallian and Rusin: Given n dice, each labeled 1 through m, how many ways are there to relabel the dice without changing the frequencies of the possible sums? We answer this question in the case where n = 2 and m is a product of three prime numbers. We also explore more general questions. We find a method for decomposing two m-sided dice into two dice of different sizes and give some preliminary results on relabeling two dice of different sizes. Finally, we refine a result of the aforementioned authors in the case where m is a prime power.