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Towards an operad-based cryptography: Applications of commutative operads-key cryptography. Commutative operads were introduced by S.N. Tronin in 2006. They are a special case of algebraic
Some new platforms for algebraic cryptography and one method of increasing the security groupoids and the commutative operads in algebraic cryptography. Also, we introduce a general method
Towards an operad-based cryptography: Applications of commutative operads-key cryptography. Commutative operads were introduced by S.N. Tronin in 2006. They are a special case of algebraic
Some new platforms for algebraic cryptography and one method of increasing the security groupoids and the commutative operads in algebraic cryptography. Also, we introduce a general method
RSA cryptosystem for dedekind rings for the maximum possible algebraic generalization of the classical RSA algorithm. We substitute ideals of a
RSA cryptosystem for dedekind rings for the maximum possible algebraic generalization of the classical RSA algorithm. We substitute ideals of a
Mathematical methods in solutions of the problems presented at the Third International Students' Olympiad in CryptographyThe mathematical problems, presented at the Third International Students’ Olympiad in Cryptography
Some new platforms for Algebraic Cryptography, and one method of increasing the securitySome new platforms for Algebraic Cryptography, and one method of increasing the security
Дискретные дифференцирования и интегрирования и их возможные приложения к алгебре и криптографииDiscrete differentiations and integrations and their possible applications to algebra
Split-complex numbers in neural cryptographySplit-complex numbers in neural cryptography
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