English

High Order Elements in Finite Fields Arising from Recursive Towers

Number Theory 2023-08-02 v2

Abstract

We provide a recipe to construct towers of fields producing high order elements in GF(q,2n)\mathrm{GF}(q,2^n), for odd qq, and in GF(2,23n)\mathrm{GF}(2,2 \cdot 3^n), for n1n \ge 1. These towers are obtained recursively by xn2+xn=v(xn1)x_{n}^2 + x_{n} = v(x_{n - 1}), for odd qq, or xn3+xn=v(xn1)x_{n}^3 + x_{n} = v(x_{n - 1}), for q=2q=2, where v(x)v(x) is a polynomial of small degree over the prime field GF(q,1)\mathrm{GF}(q,1) and xnx_n belongs to the finite field extension GF(q,2n)\mathrm{GF}(q,2^n), for qq odd, or to GF(2,23n)\mathrm{GF}(2,2\cdot 3^n). Several examples are carried out and analysed numerically. The lower bounds of the orders of the groups generated by xnx_n, or by the discriminant δn\delta_n of the polynomial, are similar to the ones obtained in [BCG+09], but we get better numerical results in some cases.

Keywords

Cite

@article{arxiv.2009.10572,
  title  = {High Order Elements in Finite Fields Arising from Recursive Towers},
  author = {Valerio Dose and Pietro Mercuri and Ankan Pal and Claudio Stirpe},
  journal= {arXiv preprint arXiv:2009.10572},
  year   = {2023}
}
R2 v1 2026-06-23T18:43:15.177Z