Reproducible families of codes and cryptographic applications

IF 0.5 Q4 COMPUTER SCIENCE, THEORY & METHODS

Journal of Mathematical Cryptology Pub Date : 2021-01-01 DOI:10.1515/jmc-2020-0003

P. Santini, Edoardo Persichetti, M. Baldi

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引用次数: 5

Abstract

Abstract Structured linear block codes such as cyclic, quasi-cyclic and quasi-dyadic codes have gained an increasing role in recent years both in the context of error control and in that of code-based cryptography. Some well known families of structured linear block codes have been separately and intensively studied, without searching for possible bridges between them. In this article, we start from well known examples of this type and generalize them into a wider class of codes that we call ℱ-reproducible codes. Some families of ℱ-reproducible codes have the property that they can be entirely generated from a small number of signature vectors, and consequently admit matrices that can be described in a very compact way. We denote these codes as compactly reproducible codes and show that they encompass known families of compactly describable codes such as quasi-cyclic and quasi-dyadic codes. We then consider some cryptographic applications of codes of this type and show that their use can be advantageous for hindering some current attacks against cryptosystems relying on structured codes. This suggests that the general framework we introduce may enable future developments of code-based cryptography.

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可复制的代码族和密码学应用

结构化线性分组码，如循环码、准循环码和准二进码，近年来在错误控制和基于码的密码学中发挥了越来越大的作用。一些众所周知的结构化线性分组码家族已经被单独和深入地研究过，而没有在它们之间寻找可能的桥梁。在本文中，我们从这种类型的众所周知的示例开始，并将它们推广到更广泛的代码类别中，我们称之为可再现代码。某些可重现的密码族具有这样的性质:它们可以完全由少量的签名向量生成，因此允许用非常紧凑的方式描述矩阵。我们将这些码表示为紧可再生码，并证明它们包含已知的紧可描述码族，如拟循环码和拟二进码。然后，我们考虑了这种类型的代码的一些密码学应用，并表明它们的使用对于阻碍当前依赖于结构化代码的密码系统的一些攻击是有利的。这表明，我们引入的通用框架可能使基于代码的密码学的未来发展成为可能。

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