Existence of primitive k-normal elements for critical values over finite fields

Abstract

Let Fqn be a finite field with qn elements. An element α ∈ Fqn is called k-normal over Fq if α and its conjugates generate a vector subspace of Fqn of dimension n-k over Fq. The existence of primitive k-normal elements and related properties have been studied throughout the past few years for k > n/2. In this paper, we provide general results on the existence of primitive k-normal elements for the critical value k = n/2, which have not been studied until now, except for n = 4. Furthermore, we show the strength of this result by providing a complete characterization of the existence of primitive 3-normal elements in Fq6 over Fq.

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