English

On Gauss Periods

Number Theory 2016-08-05 v1

Abstract

Let qq be a prime power, and let r=nk+1r=nk+1 be a prime such that rqr\nmid q, where nn and kk are positive integers. Under a simple condition on qq, rr and kk, a Gauss period of type (n,k)(n,k) is a normal element of Fqn\Bbb F_{q^n} over Fq\Bbb F_q; the complexity of the resulting normal basis of Fqn\Bbb F_{q^n} over Fq\Bbb F_q is denoted by C(n,k;q)C(n,k;q). Recent works determined C(n,k;q)C(n,k;q) for k7k\le 7 and all qualified nn and qq. In this paper, we show that for any given k>0k>0, C(n,k;q)C(n,k;q) is given by an explicit formula except for finitely many primes r=nk+1r=nk+1 and the exceptional primes are easily determined. Moreover, we describe an algorithm that allows one to compute C(n,k;q)C(n,k;q) for the exceptional primes r=nk+1r=nk+1. The numerical results of the paper cover C(n,k;q)C(n,k;q) for k20k\le 20 and all qualified nn and qq.

Keywords

Cite

@article{arxiv.1608.01655,
  title  = {On Gauss Periods},
  author = {Xiang-dong Hou},
  journal= {arXiv preprint arXiv:1608.01655},
  year   = {2016}
}

Comments

25 pages, 1 figure, 1 table

R2 v1 2026-06-22T15:12:41.562Z