Eisenstein's criterion, Fermat's last theorem, and a conjecture on powerful numbers

Abstract

Given integers > m >0, we define monic polynomials Xn, Yn, and Zn with the property that μ is a zero of Xn if and only if the triple (μ,μ+m,μ+) satisfies xn + yn = zn. It is shown that the irreducibility of these polynomials implies Fermat's last theorem. It is also shown, in a precise asymptotic sense, that for a vast majority of cases, these polynomials are irreducible via Eisenstein's criterion. We conclude by offering a conjecture on powerful numbers.