On a Conjecture of Butler and Graham

Abstract

Motivated by a hat guessing problem proposed by Iwasawa Iwasawa10, Butler and Graham Butler11 made the following conjecture on the existence of certain way of marking the coordinate lines in [k]n: there exists a way to mark one point on each coordinate line in [k]n, so that every point in [k]n is marked exactly a or b times as long as the parameters (a,b,n,k) satisfies that there are non-negative integers s and t such that s+t = kn and as+bt = nkn-1. In this paper we prove this conjecture for any prime number k. Moreover, we prove the conjecture for the case when a=0 for general k.