Large degree primitive points on curves
Abstract
A number field K is called primitive if Q and K are the only subfields of K. Let X be a nice curve over Q of genus g. A point P of degree d on X is called primitive if the field of definition Q(P) of the point is primitive. In this short note we prove that if X has a divisor of degree d> 2g, then X has infinitely many primitive points of degree d. This complements the results of Khawaja and Siksek that show that points of low degree are not primitive under certain conditions.
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