Q-curves, Hecke characters and some Diophantine equations

Abstract

In this article we study the equations x4+dy2=zp and x2+dy6=zp for positive square-free values of d. A Frey curve over Q(-d) is attached to each primitive solution, which happens to be a Q-curve. Our main result is the construction of a Hecke character satisfying that the Frey elliptic curve representation twisted by extends to GalQ, therefore (by Serre's conjectures) corresponds to a newform in S2(n,) for explicit values of n and . Following some well known results and elimination techniques (together with some improvements) it provides a systematic procedure to study solutions of the above equations and allows us to prove non-existence of non-trivial primitive solutions for large values of p of both equations for new values of d.