Journal of Mathematical Cryptology Walter de Gruyter Impact Factor

Journal of Mathematical Cryptology - Walter de Gruyter GmbH | 2024 Cite Score:2.3 | Q3

Journal of Mathematical Cryptology With Cite Score

Cite Score and Journal Rank of Journal of Mathematical Cryptology

About: Journal of Mathematical Cryptology (JoMC) is a peer-reviewed academic journal that focuses on the mathematical aspects of cryptology. It provides a platform for high-quality research on the theoretical and applied aspects of cryptographic techniques and algorithms.
Objective: The primary objective of the Journal of Mathematical Cryptology is to advance the understanding of the mathematical foundations and techniques used in cryptography. The journal covers a broad range of topics including cryptographic algorithms, encryption and decryption methods, cryptographic protocols, security proofs, and the mathematical theory behind cryptographic systems. It aims to publish research that contributes to the development and analysis of cryptographic methods, with a focus on both theoretical advancements and practical implementations.
Interdisciplinary Approach: The journal adopts an interdisciplinary approach by integrating research from fields such as mathematics, computer science, and information security. This approach allows for a comprehensive exploration of how mathematical techniques can be applied to solve cryptographic problems and enhance security systems. Contributions that address the intersection of cryptography with other areas, such as number theory, algebra, and complexity theory, are particularly encouraged.
Impact and Significance: The Journal of Mathematical Cryptology has a significant impact on both the academic and professional communities involved in cryptography and information security. The research published in the journal contributes to the advancement of cryptographic theory and practice, providing valuable insights for researchers, practitioners, and educators. It serves as a key resource for staying informed about the latest developments and methodologies in mathematical cryptology.

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Editor-in-Chief: Massimiliano Sala

Scope: The Journal of Mathematical Cryptology is a scholarly publication that focuses on the mathematical foundations and techniques applied to cryptology and cryptography. It covers both theoretical and practical aspects of cryptographic systems and their mathematical underpinnings. Key areas covered by the journal include:
1. Cryptographic Protocols: Research on the design, analysis, and implementation of cryptographic protocols, including key exchange protocols, authentication protocols, and secure multi-party computation.
2. Encryption Algorithms: Studies on the development and analysis of encryption algorithms, including symmetric key algorithms, public key algorithms, and block and stream ciphers.
3. Cryptographic Security: Exploration of the security properties of cryptographic systems, including formal security proofs, security models, and cryptographic assumptions.
4. Number Theory in Cryptology: Research on the application of number theory to cryptology, including prime numbers, modular arithmetic, and elliptic curves.
5. Algebraic Cryptography: Studies on the use of algebraic structures in cryptographic systems, including polynomial algebra, finite fields, and algebraic curves.
6. Computational Complexity: Exploration of the computational complexity of cryptographic problems and algorithms, including complexity classes, hardness assumptions, and algorithmic efficiency.
7. Cryptographic Hash Functions: Research on the design and analysis of cryptographic hash functions, including collision resistance, preimage resistance, and hash function construction.
8. Cryptanalysis: Studies on methods for analyzing and breaking cryptographic systems, including attacks on encryption algorithms, cryptographic protocols, and hash functions.
9. Quantum Cryptography: Exploration of quantum cryptographic techniques and their mathematical foundations, including quantum key distribution and quantum-resistant algorithms.
10. Lattice-Based Cryptography: Research on lattice-based cryptographic schemes, including lattice-based encryption, digital signatures, and post-quantum cryptography.
11. Randomness and Pseudorandomness: Studies on the role of randomness and pseudorandom number generators in cryptography, including randomness extraction and pseudorandom sequence generation.
12. Computational Models: Exploration of computational models used in cryptographic research, including random oracle models, bounded storage models, and other theoretical models.
13. Secure Communication Systems: Research on the application of cryptographic techniques to secure communication systems, including secure messaging, encrypted channels, and secure protocols.
14. Cryptographic Implementations: Studies on the practical implementation of cryptographic algorithms and protocols, including hardware and software implementations, performance optimization, and security considerations.
15. Formal Methods in Cryptography: Research on the use of formal methods for verifying and analyzing cryptographic systems, including formal proofs, model checking, and verification techniques.
16. Privacy and Data Protection: Exploration of cryptographic methods for ensuring privacy and data protection, including data encryption, anonymization techniques, and privacy-preserving protocols.
17. Applications of Cryptography: Research on the application of cryptographic techniques in various domains, including secure voting, digital rights management, and electronic payments.
18. Cryptographic Theory: Studies on the theoretical foundations of cryptography, including foundational principles, theoretical models, and cryptographic primitives.
19. Cryptographic Standards: Research on the development and evaluation of cryptographic standards and protocols, including compliance with international standards and best practices.