Existence results for primitive elements in cubic and quartic extensions of a finite field

Abstract

With the finite field of q elements, we investigate the following question. If γ generates over and β is a non-zero element of , is there always an a ∈ such that β(γ + a) is a primitive element? We resolve this case when n=3, thereby proving a conjecture by Cohen. We also improve substantially on what is known when n=4.