AbstractIn this paper, we consider the open problem of the complexity of the LLL algorithm in the case when the approximation parameter of the algorithm has as its extreme value 1. This case is of interest because the output is then the strongest Lovász-reduced basis. Experiments reported by Lagarias and Odlyzko (J. ACM 32(1) (1985) 229) seem to show that the algorithm remains polynomial in average. However, no bound better than a naive exponential order one is established for the worst-case complexity of the optimal LLL algorithm, even for fixed small dimension (higher than 2). Here, we prove that, for any fixed dimension n, the number of iterations of the LLL algorithm is linear with respect to the size of the input. It is easy to deduce ...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...
The LLL algorithm is recognized as one of the most important achievements of twentieth century with ...
We describe a new LLL-type algorithm, H-LLL, that relies on Householder transformations to approxima...
Abstract. In this paper, we consider the open problem of the complexity of the LLL algorithm in the ...
AbstractIn this paper, we consider the open problem of the complexity of the LLL algorithm in the ca...
AbstractAn upper bound is established regarding the average number of iterations of the lattice redu...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
The Lenstra-Lenstra-Lovász basis reduction algorithm, also known as LLL algorithm, is an algorithm t...
International audienceWe devise an algorithm, L1 tilde, with the following specifications: It takes ...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
We modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lovasz [LL...
International audienceThe LLL algorithm is a polynomial-time algorithm for reducing d-dimensional la...
Lattice basis reduction arises from many applications, such as cryptography, communications, GPS and...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the firs...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...
The LLL algorithm is recognized as one of the most important achievements of twentieth century with ...
We describe a new LLL-type algorithm, H-LLL, that relies on Householder transformations to approxima...
Abstract. In this paper, we consider the open problem of the complexity of the LLL algorithm in the ...
AbstractIn this paper, we consider the open problem of the complexity of the LLL algorithm in the ca...
AbstractAn upper bound is established regarding the average number of iterations of the lattice redu...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
The Lenstra-Lenstra-Lovász basis reduction algorithm, also known as LLL algorithm, is an algorithm t...
International audienceWe devise an algorithm, L1 tilde, with the following specifications: It takes ...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
We modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lovasz [LL...
International audienceThe LLL algorithm is a polynomial-time algorithm for reducing d-dimensional la...
Lattice basis reduction arises from many applications, such as cryptography, communications, GPS and...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the firs...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...
The LLL algorithm is recognized as one of the most important achievements of twentieth century with ...
We describe a new LLL-type algorithm, H-LLL, that relies on Householder transformations to approxima...