A Sidon space is a subspace of an extension field over a base field in which the product of any two elements can be factored uniquely, up to constants. This paper proposes a new public-key cryptosystem of the multivariate type which is based on Sidon spaces, and has the potential to remain secure even if quantum supremacy is attained. This system, whose security relies on the hardness of the well-known MinRankproblem, is shown to be resilient to several straightforward algebraic attacks. In particular, it is proved that the two popular attacks on the MinRank problem, the kernel attack, and the minor attack, succeed only with exponentially small probability. The system is implemented in software, and its hardness is demonstrated experimentally.
翻译:Sidon 空间是基场上一个扩展场的子空间,在这个基场上,任何两个元素的产物都可以被单独地乘以直到恒定。本文件提出了基于Sidon 空间的多变量类型的新的公用钥匙加密系统,即使达到了量子至上,也有可能保持安全。这个系统的安全依赖于众所周知的MinRankproblem的硬性,事实证明它能够适应几次直截了当的代数攻击。特别是,事实证明,对MinRank 问题的两次民众攻击,即内核攻击和轻微攻击,只有在极小的概率下才能成功。这个系统是在软件中实施的,其硬性是实验性的。
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