Skip to main content
1 of 3

Nontransitive dice: the least number of faces?

Here is an introduction to nontransitive dice. The question is: given $n$-player with a $m$-sided dice each one, the what is the minimum of $m$ for a fixed $n$ to produce nontransitivity?

Here is some related posts:

What is the most extreme set 4 or 5 nontransitive n-sided dice?

What is the most unfair set of three nontransitive dice?

How far can probability intransitivity be stretched?