This paper reports on the computation of a discrete logarithm in the finite field $\mathbb F_{2^30750}$, breaking by a large margin the previous record, which was set in January 2014 by a computation in $\mathbb F_{2^30750}$. The present computation made essential use of the elimination step of the quasi-polynomial algorithm due to Granger, Kleinjung and Zumbrägel, and is the first large-scale experiment to truly test and successfully demonstrate its potential when applied recursively, which is when it leads to the stated complexity. It required the equivalent of about 2900 core years on a single core of an Intel Xeon Ivy Bridge processor running at 2.6 GHz, which is comparable to the approximately 3100 core years expended for the discrete ...
International audienceWe report on two new records: the factorization of RSA-240, a 795-bit number, ...
International audienceThe advent of a heuristic quasi-polynomial complexity algorithm in 2013 for so...
International audienceIn the present work, we present a new discrete logarithm algorithm, in the sam...
This paper reports on the computation of a discrete logarithm in the finite field $\mathbb{F}_{2^{30...
This paper reports on the computation of a discrete logarithm in the finite field $\mathbb F_{2^3075...
International audienceComputing discrete logarithms in finite fields is a main concern in cryptograp...
Given a group G and two elements g,h ∈ G, solving the discrete logarithm problem consists of finding...
In this paper we show how some recent ideas regarding the discrete logarithm problem (DLP) in finite...
International audienceWe describe in this article how we have been able to extend the record for com...
International audienceThe Number Field Sieve (NFS) algorithm is the best known method to compute dis...
The number field sieve is the best-known algorithm for factoring integers and solving the discrete l...
International audienceThe aim of this work is to investigate the hardness of the discrete logarithm ...
Membre du Jury : von zur Gathen, Joachim et Coppersmith, Don et Berger, Thierry et Villard, Gillles ...
In this paper we propose a binary field variant of the Joux-Lercier medium-sized Function Field Siev...
Computing discrete logarithms is a long-standing algorithmic problem, whose hardness forms the basis...
International audienceWe report on two new records: the factorization of RSA-240, a 795-bit number, ...
International audienceThe advent of a heuristic quasi-polynomial complexity algorithm in 2013 for so...
International audienceIn the present work, we present a new discrete logarithm algorithm, in the sam...
This paper reports on the computation of a discrete logarithm in the finite field $\mathbb{F}_{2^{30...
This paper reports on the computation of a discrete logarithm in the finite field $\mathbb F_{2^3075...
International audienceComputing discrete logarithms in finite fields is a main concern in cryptograp...
Given a group G and two elements g,h ∈ G, solving the discrete logarithm problem consists of finding...
In this paper we show how some recent ideas regarding the discrete logarithm problem (DLP) in finite...
International audienceWe describe in this article how we have been able to extend the record for com...
International audienceThe Number Field Sieve (NFS) algorithm is the best known method to compute dis...
The number field sieve is the best-known algorithm for factoring integers and solving the discrete l...
International audienceThe aim of this work is to investigate the hardness of the discrete logarithm ...
Membre du Jury : von zur Gathen, Joachim et Coppersmith, Don et Berger, Thierry et Villard, Gillles ...
In this paper we propose a binary field variant of the Joux-Lercier medium-sized Function Field Siev...
Computing discrete logarithms is a long-standing algorithmic problem, whose hardness forms the basis...
International audienceWe report on two new records: the factorization of RSA-240, a 795-bit number, ...
International audienceThe advent of a heuristic quasi-polynomial complexity algorithm in 2013 for so...
International audienceIn the present work, we present a new discrete logarithm algorithm, in the sam...