Existence of primitive 1-normal elements in finite fields

Abstract

An element α ∈ Fqn is normal if B = \α, αq, …, αqn-1\ forms a basis of Fqn as a vector space over Fq; in this case, B is a normal basis of Fqn over Fq. The notion of k-normal elements was introduced in Huczynska et al (2013). Using the same notation as before, α is k-normal if B spans a co-dimension k subspace of Fqn. It can be shown that 1-normal elements always exist in Fqn, and Huczynska et al (2013) show that elements that are simultaneously primitive and 1-normal exist for q ≥ 3 and for large enough n when (n,q) = 1 (we note that primitive 1-normals cannot exist when n=2). In this paper, we complete this theorem and show that primitive, 1-normal elements of Fqn over Fq exist for all prime powers q and all integers n ≥ 3, thus solving Problem 6.3 from Huczynska, et al (2013).