On Asymptotic Fermat over Zp extensions of Q

Abstract

Let p 5 be a prime and let Qn,p denote the n-th layer of the cyclotomic Zp-extension of Q. We show that Qn,p has no exceptional units. We use this to prove the effective asymptotic Fermat's Last Theorem over Qn,p for all n 1 and all primes p 5 that are non-Wieferich, i.e. 2p-1 1 p2. The effectivity in our result builds on recent work of Thorne proving modularity of elliptic curves over Qn,p.