The Asymptotic Fermat's Last Theorem for Five-Sixths of Real Quadratic Fields

Abstract

Let K be a totally real field. By the asymptotic Fermat's Last Theorem over K we mean the statement that there is a constant BK such that for prime exponents p>BK the only solutions to the Fermat equation ap + bp + cp = 0 with a, b, c in K are the trivial ones satisfying abc = 0. With the help of modularity, level lowering and image of inertia comparisons we give an algorithmically testable criterion which if satisfied by K implies the asymptotic Fermat's Last Theorem over K. Using techniques from analytic number theory, we show that our criterion is satisfied by K = Q(d) for a subset of d having density 5/6 among the squarefree positive integers. We can improve this to density 1 if we assume a standard "Eichler-Shimura" conjecture.