Heavy Ball Neural Ordinary Differential Equations
This addresses a bottleneck in ODE-based neural networks for researchers and practitioners, offering incremental improvements in efficiency and performance.
The paper tackles the inefficiency in training and inference of neural ordinary differential equations (NODEs) by proposing heavy ball neural ODEs (HBNODEs), which reduce the number of function evaluations and improve accuracy on tasks like image classification and sequential modeling.
We propose heavy ball neural ordinary differential equations (HBNODEs), leveraging the continuous limit of the classical momentum accelerated gradient descent, to improve neural ODEs (NODEs) training and inference. HBNODEs have two properties that imply practical advantages over NODEs: (i) The adjoint state of an HBNODE also satisfies an HBNODE, accelerating both forward and backward ODE solvers, thus significantly reducing the number of function evaluations (NFEs) and improving the utility of the trained models. (ii) The spectrum of HBNODEs is well structured, enabling effective learning of long-term dependencies from complex sequential data. We verify the advantages of HBNODEs over NODEs on benchmark tasks, including image classification, learning complex dynamics, and sequential modeling. Our method requires remarkably fewer forward and backward NFEs, is more accurate, and learns long-term dependencies more effectively than the other ODE-based neural network models. Code is available at \url{https://github.com/hedixia/HeavyBallNODE}.