On k-normal elements over finite fields

Abstract

The so called k-normal elements appear in the literature as a generalization of normal elements over finite fields. Recently, questions concerning the construction of k-normal elements and the existence of k-normal elements that are also primitive have attracted attention from many authors. In this paper we give alternative constructions of k-normal elements and, in particular, we obtain a sieve inequality for the existence of primitive, k-normal elements. As an application, we show the existence of primitive k-normal elements for a significant proportion of k's in many field extensions. In particular, we prove that there exist primitive k-normals in Fqn over Fq in the case when k lies in the interval [1, n/4], n has a special property and q, n 420.