High Order Elements in Finite Fields Arising from Recursive Towers

Abstract

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