Incorporating NODE with Pre-trained Neural Differential Operator for Learning Dynamics

TL;DR

This paper introduces NDO-NODE, a method that enhances neural ordinary differential equations by pre-training a neural differential operator to improve stability and accuracy in learning complex dynamical systems.

Contribution

The paper proposes a novel NDO-NODE approach that incorporates a pre-trained neural differential operator to provide additional supervision, reducing reliance on numerical solvers in NODE training.

Findings

Improves forecasting accuracy across various dynamics.

Enhances stability especially for stiff ODEs.

Captures dynamic transitions more accurately.

Abstract

Learning dynamics governed by differential equations is crucial for predicting and controlling the systems in science and engineering. Neural Ordinary Differential Equation (NODE), a deep learning model integrated with differential equations, is popular in learning dynamics recently due to its robustness to irregular samples and its flexibility to high-dimensional input. However, the training of NODE is sensitive to the precision of the numerical solver, which makes the convergence of NODE unstable, especially for ill-conditioned dynamical systems. In this paper, to reduce the reliance on the numerical solver, we propose to enhance the supervised signal in the training of NODE. Specifically, we pre-train a neural differential operator (NDO) to output an estimation of the derivatives to serve as an additional supervised signal. The NDO is pre-trained on a class of basis functions and learns the mapping between the trajectory samples of these functions to their derivatives. To leverage both the trajectory signal and the estimated derivatives from NDO, we propose an algorithm called NDO-NODE, in which the loss function contains two terms: the fitness on the true trajectory samples and the fitness on the estimated derivatives that are outputted by the pre-trained NDO. Experiments on various kinds of dynamics show that our proposed NDO-NODE can consistently improve the forecasting accuracy with one pre-trained NDO. Especially for the stiff ODEs, we observe that NDO-NODE can capture the transitions in the dynamics more accurately compared with other regularization methods.