Litcius/Paper detail

Neural closure models for dynamical systems

Abhinav Gupta, Pierre F. J. Lermusiaux

2021Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences23 citationsDOIOpen Access PDF

Abstract

Complex dynamical systems are used for predictions in many domains. Because of computational costs, models are truncated, coarsened or aggregated. As the neglected and unresolved terms become important, the utility of model predictions diminishes. We develop a novel, versatile and rigorous methodology to learn non-Markovian closure parametrizations for known-physics/low-fidelity models using data from high-fidelity simulations. The new neural closure models augment low-fidelity models with neural delay differential equations (nDDEs), motivated by the Mori–Zwanzig formulation and the inherent delays in complex dynamical systems. We demonstrate that neural closures efficiently account for truncated modes in reduced-order-models, capture the effects of subgrid-scale processes in coarse models and augment the simplification of complex biological and physical–biogeochemical models. We find that using non-Markovian over Markovian closures improves long-term prediction accuracy and requires smaller networks. We derive adjoint equations and network architectures needed to efficiently implement the new discrete and distributed nDDEs, for any time-integration schemes and allowing non-uniformly spaced temporal training data. The performance of discrete over distributed delays in closure models is explained using information theory, and we find an optimal amount of past information for a specified architecture. Finally, we analyse computational complexity and explain the limited additional cost due to neural closure models.

Topics & Concepts

Closure (psychology)Dynamical systems theoryArtificial neural networkComputer scienceDifferential equationDynamical system (definition)Markov processAlgorithmDifferential (mechanical device)Mathematical modelApplied mathematicsComputational complexity theoryComplex systemMathematicsMathematical optimizationStochastic differential equationStochastic neural networkNeural systemLinear dynamical systemRecurrent neural networkDelay differential equationModel Reduction and Neural NetworksGenerative Adversarial Networks and Image SynthesisMachine Learning in Materials Science
Neural closure models for dynamical systems | Litcius