On Serre's modularity conjecture and Fermat's equation over quadratic imaginary fields of class number one

Abstract

In the present article, we extend previous results of the author and we show that when K is any quadratic imaginary field of class number one, Fermat's equation ap+bp+cp=0 does not have integral coprime solutions a,b,c ∈ K \ 0 \ such that 2 abc and p ≥ 19 is prime. The results are conjectural upon the veracity of a natural generalisation of Serre's modularity conjecture.