Fermat-type equations of signature (13,13,p) via Hilbert cuspforms

Abstract

In this paper we prove that equations of the form x13 + y13 = Czp have no non-trivial primitive solutions (a,b,c) such that 13 c if p > 4992539 for an infinite family of values for C. Our method consists in relating a solution (a,b,c) to the previous equation to a solution (a,b,c1) of another Diophantine equation with coefficients in (13). We then construct Frey-curves associated with (a,b,c1) and we prove modularity of them in order to apply the modular approach via Hilbert cusp forms over (13). We also prove a modularity result for elliptic curves over totally real cyclic number fields of interest by itself.