Functional Tensor Decompositions for Physics-Informed Neural Networks
- URL: http://arxiv.org/abs/2408.13101v1
- Date: Fri, 23 Aug 2024 14:24:43 GMT
- Title: Functional Tensor Decompositions for Physics-Informed Neural Networks
- Authors: Sai Karthikeya Vemuri, Tim Büchner, Julia Niebling, Joachim Denzler,
- Abstract summary: Physics-Informed Neural Networks (PINNs) have shown continuous and increasing promise in approximating partial differential equations (PDEs)
We propose a generalized PINN version of the classical variable separable method.
Our methodology significantly enhances the performance of PINNs, as evidenced by improved results on complex high-dimensional PDEs.
- Score: 8.66932181641177
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: Physics-Informed Neural Networks (PINNs) have shown continuous and increasing promise in approximating partial differential equations (PDEs), although they remain constrained by the curse of dimensionality. In this paper, we propose a generalized PINN version of the classical variable separable method. To do this, we first show that, using the universal approximation theorem, a multivariate function can be approximated by the outer product of neural networks, whose inputs are separated variables. We leverage tensor decomposition forms to separate the variables in a PINN setting. By employing Canonic Polyadic (CP), Tensor-Train (TT), and Tucker decomposition forms within the PINN framework, we create robust architectures for learning multivariate functions from separate neural networks connected by outer products. Our methodology significantly enhances the performance of PINNs, as evidenced by improved results on complex high-dimensional PDEs, including the 3d Helmholtz and 5d Poisson equations, among others. This research underscores the potential of tensor decomposition-based variably separated PINNs to surpass the state-of-the-art, offering a compelling solution to the dimensionality challenge in PDE approximation.
Related papers
- 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) - Learning Traveling Solitary Waves Using Separable Gaussian Neural
Networks [0.9065034043031668]
We apply a machine-learning approach to learn traveling solitary waves across various families of partial differential equations (PDEs)
Our approach integrates a novel interpretable neural network (NN) architecture into the framework of Physics-Informed Neural Networks (PINNs)
arXiv Detail & Related papers (2024-03-07T20:16:18Z) - PINNsFormer: A Transformer-Based Framework For Physics-Informed Neural Networks [22.39904196850583]
Physics-Informed Neural Networks (PINNs) have emerged as a promising deep learning framework for approximating numerical solutions to partial differential equations (PDEs)
We introduce a novel Transformer-based framework, termed PINNsFormer, designed to address this limitation.
PINNsFormer achieves superior generalization ability and accuracy across various scenarios, including PINNs failure modes and high-dimensional PDEs.
arXiv Detail & Related papers (2023-07-21T18:06:27Z) - MRF-PINN: A Multi-Receptive-Field convolutional physics-informed neural
network for solving partial differential equations [6.285167805465505]
Physics-informed neural networks (PINN) can achieve lower development and solving cost than traditional partial differential equation (PDE) solvers.
Due to the advantages of parameter sharing, spatial feature extraction and low inference cost, convolutional neural networks (CNN) are increasingly used in PINN.
arXiv Detail & Related papers (2022-09-06T12:26:22Z) - Physics-Aware Neural Networks for Boundary Layer Linear Problems [0.0]
Physics-Informed Neural Networks (PINNs) approximate the solution of general partial differential equations (PDEs) by adding them in some form as terms of the loss/cost of a Neural Network.
This paper explores PINNs for linear PDEs whose solutions may present one or more boundary layers.
arXiv Detail & Related papers (2022-07-15T21:15:06Z) - A mixed formulation for physics-informed neural networks as a potential
solver for engineering problems in heterogeneous domains: comparison with
finite element method [0.0]
Physics-informed neural networks (PINNs) are capable of finding the solution for a given boundary value problem.
We employ several ideas from the finite element method (FEM) to enhance the performance of existing PINNs in engineering problems.
arXiv Detail & Related papers (2022-06-27T08:18:08Z) - Improved Training of Physics-Informed Neural Networks with Model
Ensembles [81.38804205212425]
We propose to expand the solution interval gradually to make the PINN converge to the correct solution.
All ensemble members converge to the same solution in the vicinity of observed data.
We show experimentally that the proposed method can improve the accuracy of the found solution.
arXiv Detail & Related papers (2022-04-11T14:05:34Z) - Learning Physics-Informed Neural Networks without Stacked
Back-propagation [82.26566759276105]
We develop a novel approach that can significantly accelerate the training of Physics-Informed Neural Networks.
In particular, we parameterize the PDE solution by the Gaussian smoothed model and show that, derived from Stein's Identity, the second-order derivatives can be efficiently calculated without back-propagation.
Experimental results show that our proposed method can achieve competitive error compared to standard PINN training but is two orders of magnitude faster.
arXiv Detail & Related papers (2022-02-18T18:07:54Z) - dNNsolve: an efficient NN-based PDE solver [62.997667081978825]
We introduce dNNsolve, that makes use of dual Neural Networks to solve ODEs/PDEs.
We show that dNNsolve is capable of solving a broad range of ODEs/PDEs in 1, 2 and 3 spacetime dimensions.
arXiv Detail & Related papers (2021-03-15T19:14:41Z) - ResNet-LDDMM: Advancing the LDDMM Framework Using Deep Residual Networks [86.37110868126548]
In this work, we make use of deep residual neural networks to solve the non-stationary ODE (flow equation) based on a Euler's discretization scheme.
We illustrate these ideas on diverse registration problems of 3D shapes under complex topology-preserving transformations.
arXiv Detail & Related papers (2021-02-16T04:07:13Z) - Multipole Graph Neural Operator for Parametric Partial Differential
Equations [57.90284928158383]
One of the main challenges in using deep learning-based methods for simulating physical systems is formulating physics-based data.
We propose a novel multi-level graph neural network framework that captures interaction at all ranges with only linear complexity.
Experiments confirm our multi-graph network learns discretization-invariant solution operators to PDEs and can be evaluated in linear time.
arXiv Detail & Related papers (2020-06-16T21:56:22Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.