New Forms of Defining the Hidden Discrete Logarithm Problem

Q3 Mathematics
A. Moldovyan, N. Moldovyan
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引用次数: 3

Abstract

There are introduced novel variants of defining the discrete logarithm problem in a hidden group, which represents interest for constructing post-quantum cryptographic protocols and algorithms. This problem is formulated over finite associative algebras with non-commutative multiplication operation. In the known variant this problem, called congruent logarithm, is formulated as superposition of exponentiation operation and automorphic mapping of the algebra that is a finite non-commutative ring. Earlier it has been shown that congruent logarithm problem defined in the finite quaternion algebra can be reduced to discrete logarithm in the finite field that is an extension of the field over which the quaternion algebra is defined. Therefore further investigations of the congruent logarithm problem as primitive of the post-quantum cryptoschemes should be carried out in direction of finding new its carriers. The present paper introduces novel associative algebras possessing significantly different properties than quaternion algebra, in particular they contain no global unit. This difference had demanded a new definition of the discrete logarithm problem in a hidden group, which is different from the congruent logarithm. There are proposed several variants of such definition, in which it is used the notion of the local unite. There are considered right, left, and bi-side local unites. Two general methods for constructing the finite associative algebras with non-commutative multiplication operation are proposed. The first method relates to defining the algebras having dimension value equal to a natural number m > 1, and the second one relates to defining the algebras having arbitrary even dimensions. For the first time the digital signature algorithms based on computational difficulty of the discrete logarithm problem in a hidden group have been proposed.
隐离散对数问题定义的新形式
在隐群中定义离散对数问题的新方法被引入,这代表了构建后量子密码协议和算法的兴趣。这个问题是在具有非交换乘法运算的有限结合代数上表述的。在已知的变体中,这个问题被称为同余对数,被表述为幂运算的叠加和有限非交换环代数的自同构映射。前面已经证明了在有限四元数代数中定义的同余对数问题可以在有限域中简化为离散对数问题,有限域是四元数代数所定义的域的扩展。因此,对作为后量子密码方案原语的同余对数问题的进一步研究应朝着寻找其新载体的方向进行。本文介绍了与四元数代数具有显著不同性质的新型结合代数,特别是它们不包含全局单位。这一差异要求对隐群离散对数问题有一个不同于全等对数的新定义。有人提出了这种定义的几种变体,其中使用了局部单位的概念。有被认为是右,左,和双边的地方联合。给出了构造具有非交换乘法运算的有限关联代数的两种一般方法。第一种方法是定义维数等于自然数m > 1的代数,第二种方法是定义任意偶数维的代数。首次提出了基于隐群离散对数问题计算难度的数字签名算法。
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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来源期刊
SPIIRAS Proceedings
SPIIRAS Proceedings Mathematics-Applied Mathematics
CiteScore
1.90
自引率
0.00%
发文量
0
审稿时长
14 weeks
期刊介绍: The SPIIRAS Proceedings journal publishes scientific, scientific-educational, scientific-popular papers relating to computer science, automation, applied mathematics, interdisciplinary research, as well as information technology, the theoretical foundations of computer science (such as mathematical and related to other scientific disciplines), information security and information protection, decision making and artificial intelligence, mathematical modeling, informatization.
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