International audienceWe devise an algorithm, L1 tilde, with the following specifications: It takes as input an arbitrary basis B=(b_i)_i in Z^{d x d} of a Euclidean lattice L; It computes a basis of L which is reduced for a mild modification of the Lenstra-Lenstra-Lovász reduction; It terminates in time O(d^{5+eps} beta + d^{omega+1+eps} beta^{1+eps}) where beta = log max ||b_i|| (for any eps > 0 and omega is a valid exponent for matrix multiplication). This is the first LLL-reducing algorithm with a time complexity that is quasi-linear in the bit-length beta of the entries and polynomial in the dimension d. The backbone structure of L1 tilde is able to mimic the Knuth-Schönhage fast gcd algorithm thanks to a combination of cutting-edge in...
International audienceIn 1982, Arjen Lenstra, Hendrik Lenstra Jr. and László Lovász introduced an ef...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
The well known L 3 -reduction algorithm of Lov'asz transforms a given integer lattice basis b...
International audienceWe devise an algorithm, L1 tilde, with the following specifications: It takes ...
International audienceThe LLL algorithm is a polynomial-time algorithm for reducing d-dimensional la...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
We modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lovasz [LL...
AbstractWe modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lo...
Lattice basis reduction arises from many applications, such as cryptography, communications, GPS and...
In this article, we propose an adaptation of the algorithmic reduction theory of lattices to binary ...
International audienceLet B be a basis of a Euclidean lattice, and \tilde{B} an approximation thereo...
International audienceA general goal concerning fundamental linear algebra problems is to reduce the...
International audienceAs a typical application, the Lenstra-Lenstra-Lovász lattice basis reduction a...
Abstract Lattice reduction algorithms have numerous applications in number theory, algebra, as well ...
In this article, we propose an adaptation of the algorithmic reduction theory of lattices to binary ...
International audienceIn 1982, Arjen Lenstra, Hendrik Lenstra Jr. and László Lovász introduced an ef...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
The well known L 3 -reduction algorithm of Lov'asz transforms a given integer lattice basis b...
International audienceWe devise an algorithm, L1 tilde, with the following specifications: It takes ...
International audienceThe LLL algorithm is a polynomial-time algorithm for reducing d-dimensional la...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
We modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lovasz [LL...
AbstractWe modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lo...
Lattice basis reduction arises from many applications, such as cryptography, communications, GPS and...
In this article, we propose an adaptation of the algorithmic reduction theory of lattices to binary ...
International audienceLet B be a basis of a Euclidean lattice, and \tilde{B} an approximation thereo...
International audienceA general goal concerning fundamental linear algebra problems is to reduce the...
International audienceAs a typical application, the Lenstra-Lenstra-Lovász lattice basis reduction a...
Abstract Lattice reduction algorithms have numerous applications in number theory, algebra, as well ...
In this article, we propose an adaptation of the algorithmic reduction theory of lattices to binary ...
International audienceIn 1982, Arjen Lenstra, Hendrik Lenstra Jr. and László Lovász introduced an ef...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
The well known L 3 -reduction algorithm of Lov'asz transforms a given integer lattice basis b...