Related papers: Variational operator learning: A unified paradigm marrying training neural operators and solving partial differential equations

Variational operator learning: A unified paradigm marrying training neural operators and solving partial differential equations

URL: http://arxiv.org/abs/2304.04234v3
Date: Thu, 9 Nov 2023 10:02:20 GMT
Title: Variational operator learning: A unified paradigm marrying training neural operators and solving partial differential equations
Authors: Tengfei Xu, Dachuan Liu, Peng Hao, Bo Wang
Abstract summary: We propose a novel paradigm that provides a unified framework of training neural operators and solving PDEs with the variational form. With a label-free training set and a 5-label-only shift set, VOL learns solution operators with its test errors decreasing in a power law with respect to the amount of unlabeled data.
Score: 9.148052787201797
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Neural operators as novel neural architectures for fast approximating solution operators of partial differential equations (PDEs), have shown considerable promise for future scientific computing. However, the mainstream of training neural operators is still data-driven, which needs an expensive ground-truth dataset from various sources (e.g., solving PDEs' samples with the conventional solvers, real-world experiments) in addition to training stage costs. From a computational perspective, marrying operator learning and specific domain knowledge to solve PDEs is an essential step in reducing dataset costs and label-free learning. We propose a novel paradigm that provides a unified framework of training neural operators and solving PDEs with the variational form, which we refer to as the variational operator learning (VOL). Ritz and Galerkin approach with finite element discretization are developed for VOL to achieve matrix-free approximation of system functional and residual, then direct minimization and iterative update are proposed as two optimization strategies for VOL. Various types of experiments based on reasonable benchmarks about variable heat source, Darcy flow, and variable stiffness elasticity are conducted to demonstrate the effectiveness of VOL. With a label-free training set and a 5-label-only shift set, VOL learns solution operators with its test errors decreasing in a power law with respect to the amount of unlabeled data. To the best of the authors' knowledge, this is the first study that integrates the perspectives of the weak form and efficient iterative methods for solving sparse linear systems into the end-to-end operator learning task.

Related papers

DeepONet as a Multi-Operator Extrapolation Model: Distributed Pretraining with Physics-Informed Fine-Tuning [6.635683993472882]
We propose a novel fine-tuning method to achieve multi-operator learning. Our approach combines distributed learning to integrate data from various operators in pre-training, while physics-informed methods enable zero-shot fine-tuning.
arXiv Detail & Related papers (2024-11-11T18:58:46Z)
DimOL: Dimensional Awareness as A New 'Dimension' in Operator Learning [63.5925701087252]
We introduce DimOL (Dimension-aware Operator Learning), drawing insights from dimensional analysis. To implement DimOL, we propose the ProdLayer, which can be seamlessly integrated into FNO-based and Transformer-based PDE solvers. Empirically, DimOL models achieve up to 48% performance gain within the PDE datasets.
arXiv Detail & Related papers (2024-10-08T10:48:50Z)
DeltaPhi: Learning Physical Trajectory Residual for PDE Solving [54.13671100638092]
We propose and formulate the Physical Trajectory Residual Learning (DeltaPhi) We learn the surrogate model for the residual operator mapping based on existing neural operator networks. We conclude that, compared to direct learning, physical residual learning is preferred for PDE solving.
arXiv Detail & Related papers (2024-06-14T07:45:07Z)
Data-Efficient Operator Learning via Unsupervised Pretraining and In-Context Learning [45.78096783448304]
In this work, seeking data efficiency, we design unsupervised pretraining for PDE operator learning. We mine unlabeled PDE data without simulated solutions, and we pretrain neural operators with physics-inspired reconstruction-based proxy tasks. Our method is highly data-efficient, more generalizable, and even outperforms conventional vision-pretrained models.
arXiv Detail & Related papers (2024-02-24T06:27:33Z)
Parametric Learning of Time-Advancement Operators for Unstable Flame Evolution [0.0]
This study investigates the application of machine learning to learn time-advancement operators for parametric partial differential equations (PDEs) Our focus is on extending existing operator learning methods to handle additional inputs representing PDE parameters. The goal is to create a unified learning approach that accurately predicts short-term solutions and provides robust long-term statistics.
arXiv Detail & Related papers (2024-02-14T18:12:42Z)
PICL: Physics Informed Contrastive Learning for Partial Differential Equations [7.136205674624813]
We develop a novel contrastive pretraining framework that improves neural operator generalization across multiple governing equations simultaneously. A combination of physics-informed system evolution and latent-space model output are anchored to input data and used in our distance function. We find that physics-informed contrastive pretraining improves accuracy for the Fourier Neural Operator in fixed-future and autoregressive rollout tasks for the 1D and 2D Heat, Burgers', and linear advection equations.
arXiv Detail & Related papers (2024-01-29T17:32:22Z)
Physics-guided Data Augmentation for Learning the Solution Operator of Linear Differential Equations [2.1850269949775663]
We propose a physics-guided data augmentation (PGDA) method to improve the accuracy and generalization of neural operator models. We demonstrate the advantage of PGDA on a variety of linear differential equations, showing that PGDA can improve the sample complexity and is robust to distributional shift.
arXiv Detail & Related papers (2022-12-08T06:29:15Z)
Semi-supervised Learning of Partial Differential Operators and Dynamical Flows [68.77595310155365]
We present a novel method that combines a hyper-network solver with a Fourier Neural Operator architecture. We test our method on various time evolution PDEs, including nonlinear fluid flows in one, two, and three spatial dimensions. The results show that the new method improves the learning accuracy at the time point of supervision point, and is able to interpolate and the solutions to any intermediate time.
arXiv Detail & Related papers (2022-07-28T19:59:14Z)
Equivariant vector field network for many-body system modeling [65.22203086172019]
Equivariant Vector Field Network (EVFN) is built on a novel equivariant basis and the associated scalarization and vectorization layers. We evaluate our method on predicting trajectories of simulated Newton mechanics systems with both full and partially observed data.
arXiv Detail & Related papers (2021-10-26T14:26:25Z)
Large-scale Neural Solvers for Partial Differential Equations [48.7576911714538]
Solving partial differential equations (PDE) is an indispensable part of many branches of science as many processes can be modelled in terms of PDEs. Recent numerical solvers require manual discretization of the underlying equation as well as sophisticated, tailored code for distributed computing. We examine the applicability of continuous, mesh-free neural solvers for partial differential equations, physics-informed neural networks (PINNs) We discuss the accuracy of GatedPINN with respect to analytical solutions -- as well as state-of-the-art numerical solvers, such as spectral solvers.
arXiv Detail & Related papers (2020-09-08T13:26:51Z)

This list is automatically generated from the titles and abstracts of the papers in this site.