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FCT
1991
Springer
1991
Springer
Lattice Basis Reduction: Improved Practical Algorithms and Solving Subset Sum Problems
We report on improved practical algorithms for lattice basis reduction. We propose a practical oating point version of the L3{algorithm of Lenstra, Lenstra, Lovasz (1982). We present a variant of the L3{ algorithm with \deep insertions" and a practical algorithm for block Korkin{Zolotarev reduction, a concept introduced by Schnorr (1987). Empirical tests show that the strongest of these algorithms solves almost all subset sum problems with up to 66 random weights of arbitrary bit length within at most a few hours on a UNISYS 6000/70 or within a couple of minutes on a SPARC 1+ computer.
Real-time TrafficApplied Computing | FCT 1991 | Lattice Basis Reduction | Practical Algorithm | Practical Oating Point |
Related Content
| Added | 27 Aug 2010 |
| Updated | 27 Aug 2010 |
| Type | Conference |
| Year | 1991 |
| Where | FCT |
| Authors | Claus-Peter Schnorr, M. Euchner |
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