On the selection of polynomials for the DLP quasi-polynomial time algorithm in small characteristic

Abstract

In this paper we characterize the set of polynomials f∈ Fq[X] satisfying the following property: there exists a positive integer d such that for any positive integer less or equal than the degree of f, there exists t0 in Fqd such that the polynomial f-t0 has an irreducible factor of degree over Fqd[X]. This result is then used to progress in the last step which is needed to remove the heuristic from one of the quasi-polynomial time algorithms for discrete logarithm problems (DLP) in small characteristic. Our characterization allows a construction of polynomials satisfying the wanted property. The method is general and can be used to tackle similar problems which involve factorization patterns of polynomials over finite fields.