Litcius/Paper detail

A graph convolutional autoencoder approach to model order reduction for parametrized PDEs

Federico Pichi, Beatriz Moya, Jan S. Hesthaven

2024Journal of Computational Physics67 citationsDOIOpen Access PDF

Abstract

The present work proposes a framework for nonlinear model order reduction based on a Graph Convolutional Autoencoder (GCA-ROM). In the reduced order modeling (ROM) context, one is interested in obtaining real-time and many-query evaluations of parametric Partial Differential Equations (PDEs). Linear techniques such as Proper Orthogonal Decomposition (POD) and Greedy algorithms have been analyzed thoroughly, but they are more suitable when dealing with linear and affine models showing a fast decay of the Kolmogorov n-width. On one hand, the autoencoder architecture represents a nonlinear generalization of the POD compression procedure, allowing one to encode the main information in a latent set of variables while extracting their main features. On the other hand, Graph Neural Networks (GNNs) constitute a natural framework for studying PDE solutions defined on unstructured meshes. Here, we develop a non-intrusive and data-driven nonlinear reduction approach, exploiting GNNs to encode the reduced manifold and enable fast evaluations of parametrized PDEs. We show the capabilities of the methodology for several models: linear/nonlinear and scalar/vector problems with fast/slow decay in the physically and geometrically parametrized setting. The main properties of our approach consist of (i) high generalizability in the low-data regime even for complex behaviors, (ii) physical compliance with general unstructured grids, and (iii) exploitation of pooling and un-pooling operations to learn from scattered data. Code availability: https://github.com/fpichi/gca-rom

Topics & Concepts

AutoencoderComputer scienceNonlinear systemAlgorithmPartial differential equationConvolutional neural networkTheoretical computer scienceMathematical optimizationArtificial intelligenceMathematicsArtificial neural networkMathematical analysisPhysicsQuantum mechanicsModel Reduction and Neural NetworksReal-time simulation and control systemsProbabilistic and Robust Engineering Design