In this paper, we firstly generalize the relations among the basis vectors of LLL reduced basis to semi k-reduced basis. Then we analyze the complexities of the nearest plane algorithm and round-off algorithm on semi k-reduced basis, which, compared with L. Babai’s results on LLL reduced basis, have better approximate ratios and contain almost the same time complexities
AbstractWe modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lo...
Fastest algorithms and implementations for LLL basis reduction are highly hybrid symbolic-numeric. A...
In this semitutorial paper, a comprehensive survey of closest point search methods for lattices with...
The LLL algorithm is recognized as one of the most important achievements of twentieth century with ...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
The lattice A* is an important lattice because of its covering properties in low dimensions. Clarkso...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
In this paper, we give a definition of an optimally reduced basis for a lattice in the sense that an...
The lattice Ais an important lattice because of its covering properties in low dimensions. Two algor...
AbstractTwo new lattice reduction algorithms are presented and analyzed. These algorithms, called th...
The lattice A*n is an important lattice because of its covering properties in low dimensions. Two al...
Lattice basis reduction arises from many applications, such as cryptography, communications, GPS and...
Let B be a basis of a Euclidean lattice, and B ̃ an approxima-tion thereof. We give a sufficient con...
International audienceAs a typical application, the Lenstra-Lenstra-Lovász lattice basis reduction a...
The Lenstra-Lenstra-Lovász basis reduction algorithm, also known as LLL algorithm, is an algorithm t...
AbstractWe modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lo...
Fastest algorithms and implementations for LLL basis reduction are highly hybrid symbolic-numeric. A...
In this semitutorial paper, a comprehensive survey of closest point search methods for lattices with...
The LLL algorithm is recognized as one of the most important achievements of twentieth century with ...
This thesis presents the Lenstra, Lenstra, and Lovász algorithm (more commonly the LLL-algorithm), w...
The lattice A* is an important lattice because of its covering properties in low dimensions. Clarkso...
The LLL basis reduction algorithm was the first polynomial-time algorithm to compute a reduced basis...
In this paper, we give a definition of an optimally reduced basis for a lattice in the sense that an...
The lattice Ais an important lattice because of its covering properties in low dimensions. Two algor...
AbstractTwo new lattice reduction algorithms are presented and analyzed. These algorithms, called th...
The lattice A*n is an important lattice because of its covering properties in low dimensions. Two al...
Lattice basis reduction arises from many applications, such as cryptography, communications, GPS and...
Let B be a basis of a Euclidean lattice, and B ̃ an approxima-tion thereof. We give a sufficient con...
International audienceAs a typical application, the Lenstra-Lenstra-Lovász lattice basis reduction a...
The Lenstra-Lenstra-Lovász basis reduction algorithm, also known as LLL algorithm, is an algorithm t...
AbstractWe modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lo...
Fastest algorithms and implementations for LLL basis reduction are highly hybrid symbolic-numeric. A...
In this semitutorial paper, a comprehensive survey of closest point search methods for lattices with...