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A fuzzy activation function based zeroing neural network for dynamic Arnold map image cryptography

Author

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  • Jin, Jie
  • Lei, Xiaoyang
  • Chen, Chaoyang
  • Li, Zhijing

Abstract

As an effective method for time-varying problems solving, zeroing neural network (ZNN) has been frequently applied in science and engineering. In order to improve its performances in practical applications, a fuzzy activation function (FAF) is designed by introducing the fuzzy logic technology, and a fuzzy activation function based zeroing neural network (FAF-ZNN) model for fast solving time-varying matrix inversion (TVMI) is proposed. Rigorous mathematical analysis and comparative simulation experiments with other models guarantee its superior convergence and robustness to noises. In addition, based on the proposed FAF-ZNN model, a new dynamic Arnold map image cryptography algorithm is designed. Specifically, in the new dynamic image encryption, a dynamic key matrix is introduced, and the FAF-ZNN model is applied to fast compute the inversion of the dynamic key matrix for the dynamic Arnold map image cryptography decryption process. The effectiveness of the dynamic image encryption algorithm is verified by experiment results, which enhances the security of existing image encryption algorithms.

Suggested Citation

  • Jin, Jie & Lei, Xiaoyang & Chen, Chaoyang & Li, Zhijing, 2025. "A fuzzy activation function based zeroing neural network for dynamic Arnold map image cryptography," Mathematics and Computers in Simulation (MATCOM), Elsevier, vol. 230(C), pages 456-469.
    • Handle: RePEc:eee:matcom:v:230:y:2025:i:c:p:456-469
    DOI: 10.1016/j.matcom.2024.10.031
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