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PHYSICS-INFORMED NEURAL NETWORKS FOR MODELING OF 3D FLOW THERMAL PROBLEMS WITH SPARSE DOMAIN DATA

Saakaar Bhatnagar, Andrew Comerford, Araz Banaeizadeh

2024Journal of Machine Learning for Modeling and Computing10 citationsDOIOpen Access PDF

Abstract

Successfully training physics-informed neural networks (PINNs) for highly nonlinear partial differential equations (PDEs) on complex 3D domains remains a challenging task. In this paper, PINNs are employed to solve the 3D incompressible Navier-Stokes equations at moderate to high Reynolds numbers for complex geometries. The presented method utilizes very sparsely distributed solution data in the domain. A detailed investigation of the effect of the amount of supplied data and the PDE-based regularizers is presented. Additionally, a hybrid data-PINNs approach is used to generate a surrogate model of a realistic flow thermal electronics design problem. This surrogate model provides near real-time sampling and was found to outperform standard data-driven neural networks (NNs) when tested on unseen query points. The findings of the paper show how PINNs can be effective when used in conjunction with sparse data for solving 3D nonlinear PDEs or for surrogate modeling of design spaces governed by them.

Topics & Concepts

Artificial neural networkNonlinear systemPartial differential equationFlow (mathematics)Surrogate modelReynolds numberDomain (mathematical analysis)Computer scienceSampling (signal processing)Task (project management)Navier–Stokes equationsArtificial intelligenceAlgorithmApplied mathematicsCompressibilityMachine learningPhysicsMathematicsMathematical analysisMechanicsManagementEconomicsTurbulenceComputer visionFilter (signal processing)Quantum mechanicsModel Reduction and Neural NetworksFluid Dynamics and Turbulent FlowsNuclear Engineering Thermal-Hydraulics