Differential Equation Units: Learning Functional Forms of Activation Functions from Data

Authors

  • MohamadAli Torkamani Amazon.com
  • Shiv Shankar University of Massachusetts Amherst
  • Amirmohammad Rooshenas University of Massachusetts Amherst
  • Phillip Wallis Microsoft Dynamics 365 AI

DOI:

https://doi.org/10.1609/aaai.v34i04.6065

Abstract

Most deep neural networks use simple, fixed activation functions, such as sigmoids or rectified linear units, regardless of domain or network structure. We introduce differential equation units (DEUs), an improvement to modern neural networks, which enables each neuron to learn a particular nonlinear activation function from a family of solutions to an ordinary differential equation. Specifically, each neuron may change its functional form during training based on the behavior of the other parts of the network. We show that using neurons with DEU activation functions results in a more compact network capable of achieving comparable, if not superior, performance when compared to much larger networks.

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Published

2020-04-03

How to Cite

Torkamani, M., Shankar, S., Rooshenas, A., & Wallis, P. (2020). Differential Equation Units: Learning Functional Forms of Activation Functions from Data. Proceedings of the AAAI Conference on Artificial Intelligence, 34(04), 6030-6037. https://doi.org/10.1609/aaai.v34i04.6065

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Section

AAAI Technical Track: Machine Learning