On the ideal shortest vector problem over random rational primes

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Authors Yanbin Pan, Jun Xu, Nick Wadleigh, Qi Cheng arXiv ID 2004.10278 Category cs.CR: Cryptography & Security Cross-listed math.NT Citations 19 Venue IACR Cryptology ePrint Archive Last Checked 3 months ago
Abstract
Any ideal in a number field can be factored into a product of prime ideals. In this paper we study the prime ideal shortest vector problem (SVP) in the ring $ \Z[x]/(x^{2^n} + 1) $, a popular choice in the design of ideal lattice based cryptosystems. We show that a majority of rational primes lie under prime ideals admitting a polynomial time algorithm for SVP. Although the shortest vector problem of ideal lattices underpins the security of Ring-LWE cryptosystem, this work does not break Ring-LWE, since the security reduction is from the worst case ideal SVP to the average case Ring-LWE, and it is one-way.
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