Generalized Fermat equation over cyclotomic Zl-extensions of totally real fields

Abstract

Let K be a totally real number field of odd degree in which 2 is inert. Let l ≥ 5 be a prime with l [K:Q] and (l-12, [K:Q])=1. We prove that if 2 is inert in K, l is non-Wieferich, i.e., 2l-1 1 l2, and l is totally ramified in K, then the asymptotic Fermat's Last Theorem holds over each n-th layer Kn,l of the cyclotomic Zl-extension of K. We then prove that the generalized Fermat equation Axp+Byp+Czp=0 has no asymptotic solution over each n-th layer Kn,l when A,B,C ∈ \u2r : u∈ OK×,\ r ∈ Z≥ 0\. For any odd prime d, we also prove that if A,B,C ∈ \ 2r ds : r,s ∈ Z≥ 0\ and hQn,l+ is odd, then the generalized Fermat equation Axp+Byp+Czp=0 has no effective asymptotic solution (a,b,c) ∈ OQn,l3 with 2 abc. The effectivity in the case of Qn,l follows from a result of Thorne proving the modularity of elliptic curves over Qn,l.