Finite field extensions with the line or translate property for r-primitive elements

Abstract

Let r,n>1 be integers and q be any prime power q such that r qn-1. We say that the extension Fqn/Fq possesses the line property for r-primitive elements property if, for every α,θ∈Fqn*, such that Fqn=Fq(θ), there exists some x∈Fq, such that α(θ+x) has multiplicative order (qn-1)/r. We prove that, for sufficiently large prime powers q, Fqn/Fq possesses the line property for r-primitive elements. We also discuss the (weaker) translate property for extensions.