Multiscale Simulations of Complex Systems by Learning their Effective Dynamics

TL;DR

This paper introduces LED, a novel framework combining machine learning and equation-free methods to efficiently simulate complex systems by learning their effective dynamics, outperforming traditional models in accuracy and computational cost.

Contribution

The paper presents a systematic framework that integrates autoencoders and recurrent neural networks to learn effective dynamics, bridging large-scale simulations and reduced order models.

Findings

LED outperforms state-of-the-art reduced models in predictability.

LED reduces computational cost by up to two orders of magnitude.

Validated on diverse benchmark problems from chemistry to fluid mechanics.

Abstract

Predictive simulations of complex systems are essential for applications ranging from weather forecasting to drug design. The veracity of these predictions hinges on their capacity to capture the effective system dynamics. Massively parallel simulations predict the system dynamics by resolving all spatiotemporal scales, often at a cost that prevents experimentation while their findings may not allow for generalisation. On the other hand reduced order models are fast but limited by the frequently adopted linearization of the system dynamics and/or the utilization of heuristic closures. Here we present a novel systematic framework that bridges large scale simulations and reduced order models to Learn the Effective Dynamics (LED) of diverse complex systems. The framework forms algorithmic alloys between non-linear machine learning algorithms and the Equation-Free approach for modeling complex systems. LED deploys autoencoders to formulate a mapping between fine and coarse-grained representations and evolves the latent space dynamics using recurrent neural networks. The algorithm is validated on benchmark problems and we find that it outperforms state of the art reduced order models in terms of predictability and large scale simulations in terms of cost. LED is applicable to systems ranging from chemistry to fluid mechanics and reduces the computational effort by up to two orders of magnitude while maintaining the prediction accuracy of the full system dynamics. We argue that LED provides a novel potent modality for the accurate prediction of complex systems.