On rationality of the intersection points of a line with a plane quartic

Abstract

We study the rationality of the intersection points of certain lines and smooth plane quartics C defined over Fq. For q ≥ 127, we prove the existence of a line such that the intersection points with C are all rational. Using another approach, we further prove the existence of a tangent line with the same property as soon as the characteristic of Fq is different from 2 and q ≥ 662+1. Finally, we study the probability of the existence of a rational flex on C and exhibit a curious behavior when the characteristic of Fq is equal to 3.