In this lecture we give a self-contained introduction to the theory of lattices in Euclidean vector spaces. We reinterpret a large class of lattice basis reduction algorithms by using the concept of a “flag”. In our reformu-lation, lattice basis reduction algorithms are more appropriately called “flag reduction” algorithms. We address a problem that arises when one attempts to find a particularly good flag for a given lattice
We present an algorithm for lattice basis reduction in function fields. In contrast to integer latti...
The Lenstra-Lenstra-Lovász basis reduction algorithm, also known as LLL algorithm, is an algorithm t...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
The LLL algorithm is recognized as one of the most important achievements of twentieth century with ...
In this paper, we give a definition of an optimally reduced basis for a lattice in the sense that an...
Abstract. In this paper we introduce several new heuristics as to speed up known lattice basis reduc...
International audienceLattice reduction algorithms have surprisingly many applications in mathematic...
Let F ( x ) be a convex function defined in R n , which is symmetric about the origin and homogeneous...
Lattice reduction algorithms are notoriously hard to predict, both in terms of running time and outp...
AbstractTwo new lattice reduction algorithms are presented and analyzed. These algorithms, called th...
A polynomial time algorithm is presented that given a rational approximation to a lattice in real n-...
We report on improved practical algorithms for lattice basis reduction. We propose a practical float...
Euclidean lattices are a rich algebraic object that occurs in a wide variety of contexts in mathemat...
Proceedings of the 2017 {ACM} on International Symposium on Symbolic and Algebraic Computation, {ISS...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
We present an algorithm for lattice basis reduction in function fields. In contrast to integer latti...
The Lenstra-Lenstra-Lovász basis reduction algorithm, also known as LLL algorithm, is an algorithm t...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
The LLL algorithm is recognized as one of the most important achievements of twentieth century with ...
In this paper, we give a definition of an optimally reduced basis for a lattice in the sense that an...
Abstract. In this paper we introduce several new heuristics as to speed up known lattice basis reduc...
International audienceLattice reduction algorithms have surprisingly many applications in mathematic...
Let F ( x ) be a convex function defined in R n , which is symmetric about the origin and homogeneous...
Lattice reduction algorithms are notoriously hard to predict, both in terms of running time and outp...
AbstractTwo new lattice reduction algorithms are presented and analyzed. These algorithms, called th...
A polynomial time algorithm is presented that given a rational approximation to a lattice in real n-...
We report on improved practical algorithms for lattice basis reduction. We propose a practical float...
Euclidean lattices are a rich algebraic object that occurs in a wide variety of contexts in mathemat...
Proceedings of the 2017 {ACM} on International Symposium on Symbolic and Algebraic Computation, {ISS...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
We present an algorithm for lattice basis reduction in function fields. In contrast to integer latti...
The Lenstra-Lenstra-Lovász basis reduction algorithm, also known as LLL algorithm, is an algorithm t...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...