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Abstract

The security of most lattice-based cryptography schemes are based on two computational hard problems which are the short integer solution (SIS) and learning with errors (LWE) problems. The computational complexity of SIS and LWE problems are related to approximating shortest vector problem and bounded distance decoding (BDD) problem. Approximating BDD is a special case of approximating closest vector problem (CVP). In this paper, we revisit the study for approximating CVP. We give a proof that approximating the CVP over |$\ell _\infty $|-norm (CVP|$_\infty $|⁠) within any constant factor is NP-hard. The result is obtained by the gap-preserving reduction from Min Total Label Cover problem in |$\ell _1$|-norm to to CVP|$_\infty $|⁠. This proof is simpler than known proofs [ 10].

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This article is published and distributed under the terms of the Oxford University Press, Standard Journals Publication Model (https://dbpia.nl.go.kr/journals/pages/open_access/funder_policies/chorus/standard_publication_model)
Issue Section:
Original Article > Section A: Computer Science Theory, Methods and Tools
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