English

Existence results on k-normal elements over finite fields

Number Theory 2018-08-14 v3

Abstract

An element αFqn\alpha \in \mathbb {F}_{q^n} is normal over Fq\mathbb {F}_q if α\alpha and its conjugates α,αq,αqn1\alpha, \alpha^q, \cdots \alpha^{q^{n-1}} form a basis of Fqn\mathbb {F}_{q^n} over Fq\mathbb {F}_q. Recently, Huczynska, Mullen, Panario and Thomson (2013) introduce the concept of kk-normal elements, generalizing the normal elements. In the past few years, many questions concerning the existence and number of kk-normal elements with specified properties have been proposed. In this paper, we discuss some of these questions and, in particular, we provide many general results on the existence of kk-normal elements with additional properties like being primitive or having large multiplicative order. We also discuss the existence and construction of kk-normal elements in finite fields, providing a connection between kk-normal elements and the factorization of xn1x^n-1 over Fq\mathbb {F}_q.

Keywords

Cite

@article{arxiv.1612.05931,
  title  = {Existence results on k-normal elements over finite fields},
  author = {Lucas Reis},
  journal= {arXiv preprint arXiv:1612.05931},
  year   = {2018}
}

Comments

This new version is a compilation of the main results contained in the previous version and in the paper "On k-normal elements over finite fields" (ArXiv identifier: arXiv:1710.07250). In particular, we have updated the state of the knowledge on k-normal elements. *To appear in Revista Matematica Iberoamericana (EMS)

R2 v1 2026-06-22T17:27:26.341Z