A Comprehensive Physics-Informed Machine Learning Framework for Predictive Turbulence Modeling

TL;DR

This paper develops a comprehensive physics-informed machine learning framework that improves turbulence modeling by accurately predicting Reynolds stresses and propagating these predictions to velocity fields in complex flows.

Contribution

It introduces a complete PIML framework including learning, predicting, and propagating Reynolds stress discrepancies for better turbulence simulation accuracy.

Findings

Excellent prediction of Reynolds stresses across different flows.

Accurate velocity field propagation from Reynolds stress predictions.

Demonstrated effectiveness in a turbulent duct flow at high Reynolds number.

Abstract

Although an increased availability of computational resources has enabled high-fidelity simulations of turbulent flows, the RANS models are still the dominant tools for industrial applications. However, the predictive capabilities of RANS models are limited by potential inaccuracy driven by hypotheses in the Reynolds stress closure. Recently, a Physics-Informed Machine Learning (PIML) approach has been proposed to learn the functional form of Reynolds stress discrepancy in RANS simulations based on available data. It has been demonstrated that the learned discrepancy function can be used to improve Reynolds stresses in different flows where data are not available. However, owing to a number of challenges, the improvements have been demonstrated only in the Reynolds stress prediction but not in the corresponding propagated quantities of interest. In this work, we introduce the procedures toward a complete PIML framework for predictive turbulence modeling, including learning Reynolds stress discrepancy function, predicting Reynolds stresses in different flows, and propagating to mean flow fields. The process of Reynolds stress propagation and predictive accuracy of the propagated velocity field are investigated. To improve the learning-prediction performance, the input features are enriched based on an integrity basis of invariants. The fully developed turbulent flow in a square duct is used as the test case. The discrepancy model is trained on flow fields obtained from several Reynolds numbers and evaluated on a duct flow at a Reynolds number higher than any of the training cases. The predicted Reynolds stresses are propagated to velocity field through RANS equations. Numerical results show excellent predictive performances in both Reynolds stresses and their propagated velocities, demonstrating the merits of the PIML approach in predictive turbulence modeling.