Abstract
AbstractThe aim of the paper is to present a general construction of strongly aperiodic logarithmic signatures (SALS) for elementary abelianp-groups. Their existence significantly extends the classes of tame logarithmic signatures which are used for the cryptosystem{\mathrm{MST}_{3}}. They have particular characteristics that do not share with the well-known classes of transversal or fused transversal logarithmic signatures, and therefore they will play a vital role for logarithmic signature based cryptosystems in practice. In theory, the construction of SALS is interesting in its own right as well.
Subject
Applied Mathematics,Computational Mathematics,Computer Science Applications
Cited by
6 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献
1. CONSTRUCTION OF AN IMPROVED ENCRYPTION SCHEME ON GENERALIZED SUZUKI 2-GROUPS IN THE MST3 CRYPTOSYSTEM;Cybersecurity: Education, Science, Technique;2023
2. Strong Encryption Based on the Small Ree Groups;2022 IEEE 9th International Conference on Problems of Infocommunications, Science and Technology (PIC S&T);2022-10-10
3. Encryption Scheme Based on the Generalized Suzuki 2-groups and Homomorphic Encryption;Silicon Valley Cybersecurity Conference;2022
4. Encryption Based on the Group of the Hermitian Function Field and Homomorphic Encryption;2021 IEEE 8th International Conference on Problems of Infocommunications, Science and Technology (PIC S&T);2021-10-05
5. Improved encryption scheme based on the automorphism group of the Ree function field;2021 IEEE International IOT, Electronics and Mechatronics Conference (IEMTRONICS);2021-04-21