This thesis focuses on three problems that all relate to cryptography: the factorization of integers, the computation of discrete logarithms in multiplicative sugroups of finite fields and the computation of Riemann-Roch spaces on plane projective curves.To this day, the Number Field Sieve (NFS for short) is the most efficient algorithm allowing to factor integers and compute discrete logarithms in finite fields, both in theory and in practice. First, we thoroughly study the asymptotic complexity of this algorithm. We prove very precise asymptotic formulas for the asymptotic complexity of NFS and show that, unfortunately, these formulas cannot be used to extrapolate NFS computing times for cryptographically-relevant input sizes. Indeed, suc...
abstract: This thesis project is focused on studying the number field sieve. The number field sieve ...
We introduce a new variant of the number field sieve algorithm for discrete logarithms in $\mathbb{F...
We revisit the seminal Brill-Noether algorithm for plane curves with ordinary singularities. Our new...
This thesis focuses on three problems that all relate to cryptography: the factorization of integers...
The integer factorization and discrete logarithm problems are cornerstones of several public-key cry...
The security of public-key cryptography relies mainly on the difficulty to solve some mathematical p...
The classical heuristic complexity of the Number Field Sieve (NFS) is the solution of an optimizatio...
This thesis explores improvements to well-known algorithms for integer multiplication and factorizat...
Nowadays, one area of research in cryptanalysis is solving the Discrete Logarithm Problem (DLP) in f...
International audienceWe propose a probabilistic variant of Brill-Noether's algorithm for computing ...
Cryptography is the study of techniques for secure communication in the presence of third parties, a...
International audienceComputing large Riemann-Roch spaces for plane projective curves still constitu...
Abstract. The Number Field Sieve (NFS) algorithm is the best known method to compute discrete logari...
International audienceThe Number Field Sieve (NFS) algorithm is the best known method to compute dis...
In this thesis we study at length the discrete logarithm problem in finite fields. In the first part...
abstract: This thesis project is focused on studying the number field sieve. The number field sieve ...
We introduce a new variant of the number field sieve algorithm for discrete logarithms in $\mathbb{F...
We revisit the seminal Brill-Noether algorithm for plane curves with ordinary singularities. Our new...
This thesis focuses on three problems that all relate to cryptography: the factorization of integers...
The integer factorization and discrete logarithm problems are cornerstones of several public-key cry...
The security of public-key cryptography relies mainly on the difficulty to solve some mathematical p...
The classical heuristic complexity of the Number Field Sieve (NFS) is the solution of an optimizatio...
This thesis explores improvements to well-known algorithms for integer multiplication and factorizat...
Nowadays, one area of research in cryptanalysis is solving the Discrete Logarithm Problem (DLP) in f...
International audienceWe propose a probabilistic variant of Brill-Noether's algorithm for computing ...
Cryptography is the study of techniques for secure communication in the presence of third parties, a...
International audienceComputing large Riemann-Roch spaces for plane projective curves still constitu...
Abstract. The Number Field Sieve (NFS) algorithm is the best known method to compute discrete logari...
International audienceThe Number Field Sieve (NFS) algorithm is the best known method to compute dis...
In this thesis we study at length the discrete logarithm problem in finite fields. In the first part...
abstract: This thesis project is focused on studying the number field sieve. The number field sieve ...
We introduce a new variant of the number field sieve algorithm for discrete logarithms in $\mathbb{F...
We revisit the seminal Brill-Noether algorithm for plane curves with ordinary singularities. Our new...