Points totalement r\'eels de la courbe x5+y5+z5=0

Abstract

Let Q be an algebraic closure of Q and Qtr be the subfield of Q obtained by taking the union of all totally real number fields. For any prime p≥ 3, let Fp/Q be the Fermat curve of equation xp+yp+zp=0. In 1996, Pop has shown that the field Qtr is large. In particular, the set Fp(Qtr) of the points of Fp rational over Qtr is infinite. How to explicit non-trivial points (xyz≠ 0) in Fp(Qtr) ? If one has p≥ 5, it seems that the only points already known in Fp(Qtr) are those of Fp(Q) and they are trivial. In this paper, we investigate this question in case p=5. There are no totally real fields whose degree over Q is at most 5 over which F5 has non-trivial points. We propose here to explicit infinitely many points of F5 rational over totally real fields of degree 6 over Q.

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