Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectors
In 2015, Fukase and Kashiwabara proposed an efficient method to find a very short lattice vector. Their method has been applied to solve Darmstadt shortest vector problems of dimensions 134 to 150. Their method is based on Schnorr’s random sampling, but their preprocessing is different from others....
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De Gruyter
2017-03-01
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| Series: | Journal of Mathematical Cryptology |
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| Online Access: | https://doi.org/10.1515/jmc-2016-0008 |
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doaj-8cb832d029e54d99b78edce1c77dbd082021-09-06T19:40:44ZengDe GruyterJournal of Mathematical Cryptology1862-29761862-29842017-03-0111112410.1515/jmc-2016-0008Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectorsYasuda Masaya0Yokoyama Kazuhiro1Shimoyama Takeshi2Kogure Jun3Koshiba Takeshi4Institute of Mathematics for Industry, Kyushu University, 744 Motooka, Nishi-ku, Fukuoka 819-0395, JapanDepartment of Mathematics, Rikkyo University, Nishi-Ikebukuro, Tokyo 171-850, JapanFujitsu Laboratories Ltd., 1-1, Kamikodanaka 4-chome, Nakahara-ku, Kawasaki, Kanagawa 211-8588, JapanFujitsu Laboratories Ltd., 1-1, Kamikodanaka 4-chome, Nakahara-ku, Kawasaki, Kanagawa 211-8588, JapanDivision of Mathematics, Electronics and Informatics, Graduate School of Science and Engineering, Saitama University, 255 Shimo-Okubo, Sakura, Saitama 338-8570, JapanIn 2015, Fukase and Kashiwabara proposed an efficient method to find a very short lattice vector. Their method has been applied to solve Darmstadt shortest vector problems of dimensions 134 to 150. Their method is based on Schnorr’s random sampling, but their preprocessing is different from others. It aims to decrease the sum of the squared lengths of the Gram–Schmidt vectors of a lattice basis, before executing random sampling of short lattice vectors. The effect is substantiated from their statistical analysis, and it implies that the smaller the sum becomes, the shorter sampled vectors can be. However, no guarantee is known to strictly decrease the sum. In this paper, we study Fukase–Kashiwabara’s method in both theory and practice, and give a heuristic but practical condition that the sum is strictly decreased. We believe that our condition would enable one to monotonically decrease the sum and to find a very short lattice vector in fewer steps.https://doi.org/10.1515/jmc-2016-0008svplll algorithmrandom sampling68r01 06b99 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Yasuda Masaya Yokoyama Kazuhiro Shimoyama Takeshi Kogure Jun Koshiba Takeshi |
| spellingShingle |
Yasuda Masaya Yokoyama Kazuhiro Shimoyama Takeshi Kogure Jun Koshiba Takeshi Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectors Journal of Mathematical Cryptology svp lll algorithm random sampling 68r01 06b99 |
| author_facet |
Yasuda Masaya Yokoyama Kazuhiro Shimoyama Takeshi Kogure Jun Koshiba Takeshi |
| author_sort |
Yasuda Masaya |
| title |
Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectors |
| title_short |
Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectors |
| title_full |
Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectors |
| title_fullStr |
Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectors |
| title_full_unstemmed |
Analysis of decreasing squared-sum of Gram–Schmidt lengths for short lattice vectors |
| title_sort |
analysis of decreasing squared-sum of gram–schmidt lengths for short lattice vectors |
| publisher |
De Gruyter |
| series |
Journal of Mathematical Cryptology |
| issn |
1862-2976 1862-2984 |
| publishDate |
2017-03-01 |
| description |
In 2015,
Fukase and Kashiwabara proposed an efficient method to find a very short lattice vector.
Their method has been applied to solve Darmstadt shortest vector problems of dimensions 134 to 150.
Their method is based on Schnorr’s random sampling, but their preprocessing is different from others.
It aims to decrease the sum of the squared lengths of the Gram–Schmidt vectors of a lattice basis, before executing random sampling of short lattice vectors.
The effect is substantiated from their statistical analysis, and it implies that the smaller the sum becomes, the shorter sampled vectors can be. However, no guarantee is known to strictly decrease the sum.
In this paper, we study Fukase–Kashiwabara’s method in both theory and practice, and give a heuristic but practical condition that the sum is strictly decreased.
We believe that our condition would enable one to monotonically decrease the sum
and to find a very short lattice vector in fewer steps. |
| topic |
svp lll algorithm random sampling 68r01 06b99 |
| url |
https://doi.org/10.1515/jmc-2016-0008 |
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AT yasudamasaya analysisofdecreasingsquaredsumofgramschmidtlengthsforshortlatticevectors AT yokoyamakazuhiro analysisofdecreasingsquaredsumofgramschmidtlengthsforshortlatticevectors AT shimoyamatakeshi analysisofdecreasingsquaredsumofgramschmidtlengthsforshortlatticevectors AT kogurejun analysisofdecreasingsquaredsumofgramschmidtlengthsforshortlatticevectors AT koshibatakeshi analysisofdecreasingsquaredsumofgramschmidtlengthsforshortlatticevectors |
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