Fast LLL-type lattice reduction
- We modify the concept of LLL-reduction of lattice bases in the sense of Lenstra, Lenstra, Lovasz [LLL82] towards a faster reduction algorithm. We organize LLL-reduction in segments of the basis. Our SLLL-bases approximate the successive minima of the lattice in nearly the same way as LLL-bases. For integer lattices of dimension n given by a basis of length 2exp(O(n)), SLLL-reduction runs in O(n.exp(5+epsilon)) bit operations for every epsilon > 0, compared to O(exp(n7+epsilon)) for the original LLL and to O(exp(n6+epsilon)) for the LLL-algorithms of Schnorr (1988) and Storjohann (1996). We present an even faster algorithm for SLLL-reduction via iterated subsegments running in O(n*exp(3)*log n) arithmetic steps.
Author: | Claus Peter SchnorrGND |
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URN: | urn:nbn:de:hebis:30-12071 |
URL: | http://www.mi.informatik.uni-frankfurt.de/research/papers.html |
Document Type: | Report |
Language: | English |
Year of Completion: | 2004 |
Year of first Publication: | 2004 |
Publishing Institution: | Universitätsbibliothek Johann Christian Senckenberg |
Release Date: | 2005/07/04 |
Tag: | Householder reflection; LLL-reduction; SLLL-reduction; error bounds; floating point errors; length defect; local LLLreduction; segments |
HeBIS-PPN: | 191533750 |
Institutes: | Informatik und Mathematik / Mathematik |
Informatik und Mathematik / Informatik | |
Dewey Decimal Classification: | 5 Naturwissenschaften und Mathematik / 51 Mathematik / 510 Mathematik |
Licence (German): | ![]() |