Twists of superelliptic curves without rational points

Abstract

Let n≥ 2 be an integer, F a number field, OF the integral closure of Z in F and N a positive multiple of n. The paper deals with degree N polynomials P(T) ∈ OF[T] such that the superelliptic curve Yn=P(T) has twists Yn=d· P(T) without F-rational points. We show that this condition holds if the Galois group of P(T) over F has an element which fixes no root of P(T). Two applications are given. Firstly, we prove that the proportion of degree N polynomials P(T) ∈ OF[T] with height bounded by H and such that the associated curve satisfies the desired condition tends to 1 as H tends to ∞. Secondly, we connect the problem with the recent notion of non-parametric extensions and give new examples of such extensions with cyclic Galois groups.