Primitive algebraic points on curves

Abstract

A number field K is primitive if K and Q are the only subextensions of K. Let C be a curve defined over Q. We call an algebraic point P∈ C(Q) primitive if the number field Q(P) is primitive. We present several sets of sufficient conditions for a curve C to have finitely many primitive points of a given degree d. For example, let C/Q be a hyperelliptic curve of genus g, and let 3 d g-1. Suppose that the Jacobian J of C is simple. We show that C has only finitely many primitive degree d points, and in particular it has only finitely many degree d points with Galois group Sd or Ad. However, for any even d 4, a hyperelliptic curve C/Q has infinitely many imprimitive degree d points whose Galois group is a subgroup of S2 Sd/2.