Validation and parameterization of a novel physics-constrained neural dynamics model applied to turbulent fluid flow

In fluid physics, data-driven models to enhance or accelerate time to solution are becoming increasingly popular for many application domains, such as alternatives to turbulence closures, system surrogates, or for new physics discovery. In the context of reduced order models of high-dimensional time...

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Bibliographic Details
Published in:Physics of fluids (1994) 2022-11, Vol.34 (11)
Main Authors: Shankar, Varun, Portwood, Gavin D., Mohan, Arvind T., Mitra, Peetak P., Krishnamurthy, Dilip, Rackauckas, Christopher, Wilson, Lucas A., Schmidt, David P., Viswanathan, Venkatasubramanian
Format: Article
Language:English
Subjects:
artificial intelligence
artificial neural networks
CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS
Computational fluid dynamics
Constraints
Differential equations
Fluid flow
fluid flows
fluid systems
Incompressibility
Isotropic turbulence
Machine learning
Mathematical models
Navier Stokes equations
numerical methods
Ordinary differential equations
Parameterization
Physics
Quality assessment
Reduced order models
Representations
Reynolds number
theoretical computer science
Time dependence
Turbulent flow
turbulent flows
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Summary:In fluid physics, data-driven models to enhance or accelerate time to solution are becoming increasingly popular for many application domains, such as alternatives to turbulence closures, system surrogates, or for new physics discovery. In the context of reduced order models of high-dimensional time-dependent fluid systems, machine learning methods grant the benefit of automated learning from data, but the burden of a model lies on its reduced-order representation of both the fluid state and physical dynamics. In this work, we build a physics-constrained, data-driven reduced order model for Navier–Stokes equations to approximate spatiotemporal fluid dynamics in the canonical case of isotropic turbulence in a triply periodic box. The model design choices mimic numerical and physical constraints by, for example, implicitly enforcing the incompressibility constraint and utilizing continuous neural ordinary differential equations for tracking the evolution of the governing differential equation. We demonstrate this technique on a three-dimensional, moderate Reynolds number turbulent fluid flow. In assessing the statistical quality and characteristics of the machine-learned model through rigorous diagnostic tests, we find that our model is capable of reconstructing the dynamics of the flow over large integral timescales, favoring accuracy at the larger length scales. More significantly, comprehensive diagnostics suggest that physically interpretable model parameters, corresponding to the representations of the fluid state and dynamics, have attributable and quantifiable impact on the quality of the model predictions and computational complexity.
ISSN:1070-6631
1089-7666
DOI:10.1063/5.0122115