Studying the performance of artificial neural networks on problems related to cryptography
From MaRDI portal
Publication:867941
DOI10.1016/j.nonrwa.2005.12.002zbMath1109.68047OpenAlexW2169700964MaRDI QIDQ867941
E. C. Laskari, Gerasimos C. Meletiou, Dimitris K. Tasoulis, Michael N. Vrahatis
Publication date: 19 February 2007
Published in: Nonlinear Analysis. Real World Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.nonrwa.2005.12.002
Learning and adaptive systems in artificial intelligence (68T05) Neural networks for/in biological studies, artificial life and related topics (92B20) Data encryption (aspects in computer science) (68P25)
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A short proof for explicit formulas for discrete logarithms in finite fields
- A note on discrete logarithms in finite fields
- On polynomial approximation of the discrete logarithm and the Diffie-Hellman mapping.
- Multilayer feedforward networks are universal approximators
- Adaptive stepsize algorithms for on-line training of neural networks.
- A class of gradient unconstrained minimization algorithms with adaptive stepsize
- Discrete logarithms: The past and the future
- Polynomial representations of the Diffie-Hellman mapping
- A note on the interpolation of the Diffie-Hellman mapping
- A public key cryptosystem and a signature scheme based on discrete logarithms
- New directions in cryptography
- A method for obtaining digital signatures and public-key cryptosystems
- An improved algorithm for computing logarithms over<tex>GF(p)</tex>and its cryptographic significance (Corresp.)
- The Relationship Between Breaking the Diffie--Hellman Protocol and Computing Discrete Logarithms
- On Certain Exponential Sums and the Distribution of Diffie-Hellman Triples
- A polynomial representation for logarithms in GF(q)
- Hiding information and signatures in trapdoor knapsacks
- Self-organizing maps.
- Artificial nonmonotonic neural networks
- Polynomial interpolation of the discrete logarithm
