Irreducibility and locus of complex roots of polynomials related to Fermat's Last Theorem

Abstract

We study the polynomials xn + (1-x)n + an, a ∈Q, whose rational roots would yield counterexamples to Fermat's Last Theorem. We investigate their factorization over Q. In the case a \0, 1\, we ask whether they are irreducible over Q, prove the irreducibility for several infinite families, and investigate the location of the roots of these polynomials on the complex plane. For a=1, the factorization of Ka,n is intimately related to that of the Cauchy--Mirimanoff polynomials En and the polynomials Tn and Sn introduced by P. Nanninga. After removing the trivial factors x, x-1, and x2-x+1, the remaining components agree (up to change of variable) with En, Sn, or Tn. We prove several new irreducibility results for these factors.