Interactions Between Brauer Configuration Algebras and Classical Cryptanalysis to Analyze Bach's Canons

Agustín Moreno Cañadas, Pedro Fernando Fernández Espinosa, José Gregorio Rodríguez Nieto, Odette M. Mendez, Ricardo Hugo Arteaga Bastidas
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Abstract

Since their introduction, Brauer configuration algebras (BCAs) and their specialized messages have helped research in several fields of mathematics and sciences. This paper deals with a new perspective on using such algebras as a theoretical framework in classical cryptography and music theory. It is proved that some block cyphers define labeled Brauer configuration algebras. Particularly, the dimension of the BCA associated with a ciphertext-only attack of the Vigenere cryptosystem is given by the corresponding key's length and the captured ciphertext's coincidence index. On the other hand, historically, Bach's canons have been considered solved music puzzles. However, due to how Bach posed such canons, the question remains whether their solutions are only limited to musical issues. This paper gives alternative solutions based on the theory of Brauer configuration algebras to some of the puzzle canons proposed by Bach in his Musical Offering (BWV 1079) and the canon \^a 4 Voc: Perpetuus (BWV 1073). Specifically to the canon \^a 6 Voc (BWV 1076), canon 1 \^a2 (also known as the crab canon), and canon \^a4 Quaerendo Invenietis. These solutions are obtained by interpreting such canons as ciphertexts (via route and transposition cyphers) of some specialized Brauer messages. In particular, it is noted that the structure or form of the notes used in such canons can be described via the shape of the most used symbols in Bach's works.
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布劳尔构型代数与经典密码分析之间的互动,以分析巴赫的卡农
布劳尔构型代数(BCA)及其特殊信息自问世以来,已为多个数学和科学领域的研究提供了帮助。本文从一个新的角度探讨了如何在经典密码学和音乐理论中使用布劳尔构型代数作为理论框架。本文证明了某些分块密码定义了带标记的布劳尔构型布拉,特别是维基内尔密码系统中与只攻击密文相关的布劳尔构型布拉的维度由相应密钥的长度和捕获密文的重合指数给出。另一方面,从历史上看,巴赫的卡农一直被认为是已解的音乐谜题。然而,由于巴赫是如何提出这些教规的,其解决方案是否仅限于音乐问题仍然是个问题。本文基于布劳尔构型代数理论,对巴赫在《音乐献祭》(BWV 1079)和《4 Voc. Perpetuus》(BWV 1079)中提出的一些谜题给出了替代解决方案:Perpetuus (BWV 1073)。特别是第 6 Voc 卡农(BWV 1076)、第 1 \ ^a2 卡农(又称螃蟹卡农)和第 4 Quaerendo Invenietis 卡农。这些解法是通过将这些卡农解释为某些特殊布劳尔信息的密码文本(通过路由和转移密码)而得到的。特别要指出的是,这些音调中使用的音符的结构或形式可以通过巴赫作品中最常用符号的形状来描述。
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