A quasi-polynomial algorithm for discrete logarithm in finite fields of small characteristic

Abstract

In the present work, we present a new discrete logarithm algorithm, in the same vein as in recent works by Joux, using an asymptotically more efficient descent approach. The main result gives a quasi-polynomial heuristic complexity for the discrete logarithm problem in finite field of small characteristic. By quasi-polynomial, we mean a complexity of type nO( n) where n is the bit-size of the cardinality of the finite field. Such a complexity is smaller than any L() for ε>0. It remains super-polynomial in the size of the input, but offers a major asymptotic improvement compared to L(1/4+o(1)).