Squarefree values of trinomial discriminants

Abstract

The discriminant of a trinomial of the form xn xm 1 has the form nn (n-m)n-m mm if n and m are relatively prime. We investigate when these discriminants have nontrivial square factors. We explain various unlikely-seeming parametric families of square factors of these discriminant values: for example, when n is congruent to 2 (mod 6) we have that ((n2-n+1)/3)2 always divides nn - (n-1)n-1. In addition, we discover many other square factors of these discriminants that do not fit into these parametric families. The set of primes whose squares can divide these sporadic values as n varies seems to be independent of m, and this set can be seen as a generalization of the Wieferich primes, those primes p such that 2p-1 is congruent to 1 (mod p2). We provide heuristics for the density of squarefree values of these discriminants and the density of these "sporadic" primes.