The existence of Fq-primitive points on curves using freeness

Abstract

Let CQ be the cyclic group of order Q, n a divisor of Q and r a divisor of Q/n. We introduce the set of (r,n)-free elements of CQ and derive a lower bound for the the number of elements θ ∈ Fq for which f(θ) is (r,n)-free and F(θ) is (R,N)-free, where f, F ∈ Fq[x]. As an application, we consider the existence of Fq-primitive points on curves like yn=f(x) and find, in particular, all the odd prime powers q for which the elliptic curves y2=x3 x contain an Fq-primitive point.