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Experiments from the paper "On Second Order Behaviour in Augmented Neural ODEs"

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On Second Order Behaviour in Augmented Neural ODEs

License: MIT Python 3.7+

Official code for the paper On Second Order Behaviour in Augmented Neural ODEs (Alexander Norcliffe, Cristian Bodnar, Ben Day, Nikola Simidjievski, Pietro Liò)

NODE vs ANODE vs SONODE learning a cosine

NODE vs ANODE vs SONODE on the nested spheres problem

Please note: This is research code which is no longer maintained, there may be new issues. I plan to update it to be easier to run in 2023.

Abstract

Neural Ordinary Differential Equations (NODEs) are a new class of models that transform data continuously through infinite-depth architectures. The continuous nature of NODEs has made them particularly suitable for learning the dynamics of complex physical systems. While previous work has mostly been focused on first order ODEs, the dynamics of many systems, especially in classical physics, are governed by second order laws. In this work, we take a closer look at Second Order Neural ODEs (SONODEs). We show how the adjoint sensitivity method can be extended to SONODEs and prove that an alternative first order optimisation method is computationally more efficient. Furthermore, we extend the theoretical understanding of the broader class of Augmented NODEs (ANODEs) by showing they can also learn higher order dynamics, but at the cost of interpretability. This indicates that the advantages of ANODEs go beyond the extra space offered by the augmented dimensions, as originally thought. Finally, we compare SONODEs and ANODEs on synthetic and real dynamical systems and demonstrate that the inductive biases of the former generally result in faster training and better performance.

SONODE vs ANODE(2) learning a 2D function

ANODEs and SONODEs successfully learn the trajectory in real space of a 2D ODE for two different random initialisations. However, the augmented trajectories of ANODE are in both cases widely different from the true velocity of the ODE. In contrast, SONODE converges in both cases to the true ODE.

Getting started

We used python 3.7 for this project. To setup the virtual environment and necessary packages, please run the following commands:

$ conda create -n sonode python=3.7
$ conda activate sonode
$ pip install -r requirements.txt

You will also need to install PyTorch 1.4.0 from the official website.

Running the code

Silverbox

We provide a run.sh script for each experiment in the experiments folder. All programs other than the MNIST experiments can be run on a cpu and typically finish within 2 hours depending on the machine.

Citation

For attribution in academic contexts, please cite this work as

@inproceedings{norcliffe2020_sonode,
  title={On Second Order Behaviour in Augmented Neural ODEs},
  author={Alexander Norcliffe and Cristian Bodnar and Ben Day and Nikola Simidjievski and Pietro Li{\`o}},
  booktitle = {Advances in Neural Information Processing Systems},
  year={2020}
}

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