Primitive points on some low degree Fermat curves

Abstract

Let n≥ 3 be an integer. Let Fn be the Fermat curve defined by the Fermat equation xn+yn=zn. For a curve C/Q, we say an algebraic point P∈ C(Q) is primitive if the Galois group of the Galois closure of the number field Q(P) is a primitive permutation group. Recall that A4 is a primitive subgroup of S4. We prove that there are no non-trivial quartic points on Fn with Galois closure A4, when n = 7 and n = 8. We also provide sufficient conditions for the non-existence of non-trivial points on the Fermat curves F6 and F8 defined over a given primitive number field of degree at least 3.

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