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Meta-Heuristic Optimization Methods for Quaternion-Valued Neural Networks

Author

Listed:
  • Jeremiah Bill

    (Air Force Institute of Technology, Department of Operational Sciences, WPAFB, OH 45433, USA)

  • Lance Champagne

    (Air Force Institute of Technology, Department of Operational Sciences, WPAFB, OH 45433, USA)

  • Bruce Cox

    (Air Force Institute of Technology, Department of Operational Sciences, WPAFB, OH 45433, USA)

  • Trevor Bihl

    (Air Force Research Laboratory, Sensors Directorate, WPAFB, OH 45433, USA)

Abstract

In recent years, real-valued neural networks have demonstrated promising, and often striking, results across a broad range of domains. This has driven a surge of applications utilizing high-dimensional datasets. While many techniques exist to alleviate issues of high-dimensionality, they all induce a cost in terms of network size or computational runtime. This work examines the use of quaternions, a form of hypercomplex numbers, in neural networks. The constructed networks demonstrate the ability of quaternions to encode high-dimensional data in an efficient neural network structure, showing that hypercomplex neural networks reduce the number of total trainable parameters compared to their real-valued equivalents. Finally, this work introduces a novel training algorithm using a meta-heuristic approach that bypasses the need for analytic quaternion loss or activation functions. This algorithm allows for a broader range of activation functions over current quaternion networks and presents a proof-of-concept for future work.

Suggested Citation

  • Jeremiah Bill & Lance Champagne & Bruce Cox & Trevor Bihl, 2021. "Meta-Heuristic Optimization Methods for Quaternion-Valued Neural Networks," Mathematics, MDPI, vol. 9(9), pages 1-23, April.
    • Handle: RePEc:gam:jmathe:v:9:y:2021:i:9:p:938-:d:541819
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    Citations

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    Cited by:

    1. Juan Yu & Kailong Xiong & Cheng Hu, 2024. "Synchronization Analysis for Quaternion-Valued Delayed Neural Networks with Impulse and Inertia via a Direct Technique," Mathematics, MDPI, vol. 12(7), pages 1-22, March.

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