Add to ORKGWe present a practical algorithm that given an LLL-reduced lattice basis of dimension n, runs in time O(n3(k=6)k=4+n4) and approximates the length of the shortest, non-zero lattice vector to within a factor (k=6)n=(2k). This result is based on reasonable heuristics. Compared to previous practical algorithms the new method reduces the proven approximation factor achievable in a given time to less than its fourthth root. We also present a sieve algorithm inspired by Ajtai, Kumar, Sivakumar [AKS01]
We study the algorithmic complexity of lattice problems based on the sieving technique due to Ajta...
Most algorithms for hard lattice problems are based on the principle of rank reduction: to solve a p...
AbstractWe give a simplified proof of a theorem of Lagarias, Lenstra and Schnorr [17] that the probl...
The most famous lattice problem is the Shortest Vector Problem (SVP), which has many applications in...
textabstractAsymptotically, the best known algorithms for solving the Shortest Vector Problem (SVP) ...
We present a novel practical algorithm that given a lattice basis b1, ..., bn finds in O(n exp 2 *(k...
Asymptotically, the best known algorithms for solving the Shortest Vector Problem (SVP) in a lattice...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
We show that a constant factor approximation of the shortest and closest lattice vector problem w.r....
LLL reduction, originally founded in 1982 to factor certain polynomials, is a useful tool in public ...
In this work we study speed-ups and time-space trade-offs for solving the shortest vector problem (S...
By applying a quantum search algorithm to various heuristic and provable sieve algorithms from the l...
Abstract. The Shortest lattice Vector Problem is central in lattice-based cryptography, as well as i...
An n-dimensional lattice is the set of all integral linear combinations of n linearly independent ve...
AbstractWe study four problems from the geometry of numbers, the shortest vector problem (Svp), the ...
We study the algorithmic complexity of lattice problems based on the sieving technique due to Ajta...
Most algorithms for hard lattice problems are based on the principle of rank reduction: to solve a p...
AbstractWe give a simplified proof of a theorem of Lagarias, Lenstra and Schnorr [17] that the probl...
The most famous lattice problem is the Shortest Vector Problem (SVP), which has many applications in...
textabstractAsymptotically, the best known algorithms for solving the Shortest Vector Problem (SVP) ...
We present a novel practical algorithm that given a lattice basis b1, ..., bn finds in O(n exp 2 *(k...
Asymptotically, the best known algorithms for solving the Shortest Vector Problem (SVP) in a lattice...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
We show that a constant factor approximation of the shortest and closest lattice vector problem w.r....
LLL reduction, originally founded in 1982 to factor certain polynomials, is a useful tool in public ...
In this work we study speed-ups and time-space trade-offs for solving the shortest vector problem (S...
By applying a quantum search algorithm to various heuristic and provable sieve algorithms from the l...
Abstract. The Shortest lattice Vector Problem is central in lattice-based cryptography, as well as i...
An n-dimensional lattice is the set of all integral linear combinations of n linearly independent ve...
AbstractWe study four problems from the geometry of numbers, the shortest vector problem (Svp), the ...
We study the algorithmic complexity of lattice problems based on the sieving technique due to Ajta...
Most algorithms for hard lattice problems are based on the principle of rank reduction: to solve a p...
AbstractWe give a simplified proof of a theorem of Lagarias, Lenstra and Schnorr [17] that the probl...