About r- primitive and k-normal elements in finite fields

Abstract

In 2013, Huczynska, Mullen, Panario and Thomson introduced the concept of k-normal elements: an element α ∈ Fqn is k-normal over Fq if the greatest common divisor of the polynomials gα(x)= α xn-1+αqxn-2+… +αqn-2x+αqn-1 and xn-1 in Fqn[x] has degree k, generalizing the concept of normal elements (normal in the usual sense is 0-normal). In this paper we discuss the existence of r-primitive, k-normal elements in Fqn over Fq, where an element α ∈ Fqn* is r-primitive if its multiplicative order is qn-1r. We provide many general results about the existence of this class of elements and we work a numerical example over finite fields of characteristic 11.

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