利用CVMA在所有一个多项式环上有效地实现了NTRU

2015 IEEE International Conference on Consumer Electronics - Taiwan Pub Date : 2015-06-06 DOI:10.1109/ICCE-TW.2015.7216956

Koki Misumi, Y. Nogami

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引用次数: 0

摘要

研究表明，在量子计算机和肖尔算法的基础上，可以求解基于离散对数问题的公钥密码系统。因此，需要一种新的密码系统，称为后量子密码系统，以免被量子计算机破解。NTRU由Hoffstein等人于1998年提出。它是一种后量子密码系统。它是基于晶格上的问题，没有有效的算法来解决。在NTRU中，使用卷积多项式环作为Zq[X]/(Xn-1)。然而，(X-1)是Xn-1的一个微不足道的因子有时会产生问题。因此，我们考虑使用商多项式环的变体，如Zq[X]/(Xn + Xx-1 +…)+X + 1)和CVMA:循环向量乘法算法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Efficient implimentation of NTRU over all one polynomial ring with CVMA

It is shown that public key cryptosystems based on discrete logarithm probrem can be solved if the quantum computer and Shor's algorithm are realized. Thus a new cryptosystem called post-quantum cryptosystem so as not to be broken by quantum computer is needed. NTRU is proposed by Hoffstein et al. in 1998. It is one of post-quantum cryptosystem. It is based on problems on lattice for which there are no efficient algorithms to solve. In NTRU, using convolution polynomial ring as Zq[X]/(Xn-1). However, (X-1), that is a trivial factor of Xn-1 sometimes make problems. Thus we consider a variant using a quotient polynomial ring such as Zq[X]/(Xn + Xx-1 +...+X + 1) and CVMA: Cyclic Vector Multiplication Algorithm.

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2015 IEEE International Conference on Consumer Electronics - Taiwan

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