Galois points for a plane curve and its dual curve, II

Abstract

Let C ⊂ P2 be a plane curve of degree at least three. A point P in projective plane is said to be Galois if the function field extension induced by the projection πP: C P1 from P is Galois. Further we say that a Galois point is extendable if any birational transformation induced by the Galois group can be extended to a linear transformation of the projective plane. This article is the second part of [2], where we showed that the Galois group at an extendable Galois point P has a natural action on the dual curve C* ⊂ P2* which preserves the fibers of the projection πP from a certain point P ∈ P2*. In this article we improve such a result, and we investigate the Galois group of πP. In particular, we study both when P is a Galois point, and when deg \ (πP) is prime and deg \ (πP) = 2 deg \ (πP). As an application, we determine the number of points at which the Galois groups are certain fixed groups for the dual curve of a cubic curve.