DocumentCode
390737
Title
Quantum computation and lattice problems
Author
Regev, Oded
Author_Institution
Inst. for Adv. Study, Princeton, NJ, USA
fYear
2002
fDate
2002
Firstpage
520
Lastpage
529
Abstract
We present the first explicit connection between quantum computation and lattice problems. Namely, we show a solution to the unique shortest vector problem (SVP) under the assumption that there exists an algorithm that solves the hidden subgroup problem on the dihedral group by coset sampling. Moreover, we solve the hidden subgroup problem on the dihedral group by using an average case subset sum routine. By combining the two results, we get a quantum reduction from Θ˜(n2.5)-unique-SVP to the average case subset sum problem. This is a better connection than the known classical results.
Keywords
computational complexity; group theory; lattice theory; quantum computing; average case subset sum routine; coset sampling; dihedral group; hidden subgroup problem; lattice problems; quantum computation; quantum reduction; unique shortest vector problem; Application software; Computational modeling; Cryptography; Lattices; Pervasive computing; Physics computing; Polynomials; Quantum computing; Sampling methods; Vectors;
fLanguage
English
Publisher
ieee
Conference_Titel
Foundations of Computer Science, 2002. Proceedings. The 43rd Annual IEEE Symposium on
ISSN
0272-5428
Print_ISBN
0-7695-1822-2
Type
conf
DOI
10.1109/SFCS.2002.1181976
Filename
1181976
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