Constructing irreducible polynomials recursively with a reverse composition method

Abstract

We suggest a construction of the minimal polynomial mβk of βk∈ Fqn over Fq from the minimal polynomial f= mβ for all positive integers k whose prime factors divide q-1. The computations of our construction are carried out in Fq. The key observation leading to our construction is that for k q-1 holds mβk(Xk) = Πj=1 kt ζk-jn f (ζkj X), where t= \m (n,k): f (X) = g (Xm), g ∈ Fq[X]\ and ζk is a primitive k-th root of unity in Fq. The construction allows to construct a large number of irreducible polynomials over Fq of the same degree. Since different applications require different properties, this large number allows the selection of the candidates with the desired properties.