Double exponential lower bounds for possible solutions in the Second Case of the Fermat Last Theorem

Abstract

In a recent paper, the first author provided some lower bounds to solutions of the equations of Fermat and Catalan, based on local power series developments at the ramified prime of a prime cyclotomic extension. Although both equations have in fact been proved not to have any unknown solutions, these improved bounds are interesting in the context of a new effective abc inequality announced in the paper MFHMP based on Mochizuki's Mo[IUT-IV, Theorem A]. In this paper we provide a strengthening of the lower bound for FLT2, which is necessary in order to take advantage of the best upper bounds for primes p for which it was verified on a computer that FLT2 has no solutions.