Related papers: An efficient wavelet-based physics-informed neural networks for singularly perturbed problems

An efficient wavelet-based physics-informed neural networks for singularly perturbed problems

URL: http://arxiv.org/abs/2409.11847v1
Date: Wed, 18 Sep 2024 10:01:37 GMT
Title: An efficient wavelet-based physics-informed neural networks for singularly perturbed problems
Authors: Himanshu Pandey, Anshima Singh, Ratikanta Behera,
Abstract summary: Physics-informed neural networks (PINNs) are a class of deep learning models that utilize physics as differential equations. We present an efficient wavelet-based PINNs model to solve singularly perturbed differential equations. The architecture allows the training process to search for a solution within wavelet space, making the process faster and more accurate.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Physics-informed neural networks (PINNs) are a class of deep learning models that utilize physics as differential equations to address complex problems, including ones that may involve limited data availability. However, tackling solutions of differential equations with oscillations or singular perturbations and shock-like structures becomes challenging for PINNs. Considering these challenges, we designed an efficient wavelet-based PINNs (W-PINNs) model to solve singularly perturbed differential equations. Here, we represent the solution in wavelet space using a family of smooth-compactly supported wavelets. This framework represents the solution of a differential equation with significantly fewer degrees of freedom while still retaining in capturing, identifying, and analyzing the local structure of complex physical phenomena. The architecture allows the training process to search for a solution within wavelet space, making the process faster and more accurate. The proposed model does not rely on automatic differentiations for derivatives involved in differential equations and does not require any prior information regarding the behavior of the solution, such as the location of abrupt features. Thus, through a strategic fusion of wavelets with PINNs, W-PINNs excel at capturing localized nonlinear information, making them well-suited for problems showing abrupt behavior in certain regions, such as singularly perturbed problems. The efficiency and accuracy of the proposed neural network model are demonstrated in various test problems, i.e., highly singularly perturbed nonlinear differential equations, the FitzHugh-Nagumo (FHN), and Predator-prey interaction models. The proposed design model exhibits impressive comparisons with traditional PINNs and the recently developed wavelet-based PINNs, which use wavelets as an activation function for solving nonlinear differential equations.

Related papers

Discovery of Quasi-Integrable Equations from traveling-wave data using the Physics-Informed Neural Networks [0.0]
PINNs are used to study vortex solutions in 2+1 dimensional nonlinear partial differential equations. We consider PINNs with conservation laws (referred to as cPINNs), deformations of the initial profiles, and a friction approach to improve the identification's resolution.
arXiv Detail & Related papers (2024-10-23T08:29:13Z)
Tunable Complexity Benchmarks for Evaluating Physics-Informed Neural Networks on Coupled Ordinary Differential Equations [64.78260098263489]
In this work, we assess the ability of physics-informed neural networks (PINNs) to solve increasingly-complex coupled ordinary differential equations (ODEs) We show that PINNs eventually fail to produce correct solutions to these benchmarks as their complexity increases. We identify several reasons why this may be the case, including insufficient network capacity, poor conditioning of the ODEs, and high local curvature, as measured by the Laplacian of the PINN loss.
arXiv Detail & Related papers (2022-10-14T15:01:32Z)
Semi-analytic PINN methods for singularly perturbed boundary value problems [0.8594140167290099]
We propose a new semi-analytic physics informed neural network (PINN) to solve singularly perturbed boundary value problems. The PINN is a scientific machine learning framework that offers a promising perspective for finding numerical solutions to partial differential equations.
arXiv Detail & Related papers (2022-08-19T04:26:40Z)
Wave simulation in non-smooth media by PINN with quadratic neural network and PML condition [2.7651063843287718]
The recently proposed physics-informed neural network (PINN) has achieved successful applications in solving a wide range of partial differential equations (PDEs) In this paper, we solve the acoustic and visco-acoustic scattered-field wave equation in the frequency domain with PINN instead of the wave equation to remove source perturbation. We show that PML and quadratic neurons improve the results as well as attenuation and discuss the reason for this improvement.
arXiv Detail & Related papers (2022-08-16T13:29:01Z)
Neural Operator with Regularity Structure for Modeling Dynamics Driven by SPDEs [70.51212431290611]
Partial differential equations (SPDEs) are significant tools for modeling dynamics in many areas including atmospheric sciences and physics. We propose the Neural Operator with Regularity Structure (NORS) which incorporates the feature vectors for modeling dynamics driven by SPDEs. We conduct experiments on various of SPDEs including the dynamic Phi41 model and the 2d Navier-Stokes equation.
arXiv Detail & Related papers (2022-04-13T08:53:41Z)
Physics Informed RNN-DCT Networks for Time-Dependent Partial Differential Equations [62.81701992551728]
We present a physics-informed framework for solving time-dependent partial differential equations. Our model utilizes discrete cosine transforms to encode spatial and recurrent neural networks. We show experimental results on the Taylor-Green vortex solution to the Navier-Stokes equations.
arXiv Detail & Related papers (2022-02-24T20:46:52Z)
Message Passing Neural PDE Solvers [60.77761603258397]
We build a neural message passing solver, replacing allally designed components in the graph with backprop-optimized neural function approximators. We show that neural message passing solvers representationally contain some classical methods, such as finite differences, finite volumes, and WENO schemes. We validate our method on various fluid-like flow problems, demonstrating fast, stable, and accurate performance across different domain topologies, equation parameters, discretizations, etc., in 1D and 2D.
arXiv Detail & Related papers (2022-02-07T17:47:46Z)
Characterizing possible failure modes in physics-informed neural networks [55.83255669840384]
Recent work in scientific machine learning has developed so-called physics-informed neural network (PINN) models. We demonstrate that, while existing PINN methodologies can learn good models for relatively trivial problems, they can easily fail to learn relevant physical phenomena even for simple PDEs. We show that these possible failure modes are not due to the lack of expressivity in the NN architecture, but that the PINN's setup makes the loss landscape very hard to optimize.
arXiv Detail & Related papers (2021-09-02T16:06:45Z)
Physics-informed attention-based neural network for solving non-linear partial differential equations [6.103365780339364]
Physics-Informed Neural Networks (PINNs) have enabled significant improvements in modelling physical processes. PINNs are based on simple architectures, and learn the behavior of complex physical systems by optimizing the network parameters to minimize the residual of the underlying PDE. Here, we address the question of which network architectures are best suited to learn the complex behavior of non-linear PDEs.
arXiv Detail & Related papers (2021-05-17T14:29:08Z)
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)
A nonlocal physics-informed deep learning framework using the peridynamic differential operator [0.0]
We develop a nonlocal PINN approach using the Peridynamic Differential Operator (PDDO)---a numerical method which incorporates long-range interactions and removes spatial derivatives in the governing equations. Because the PDDO functions can be readily incorporated in the neural network architecture, the nonlocality does not degrade the performance of modern deep-learning algorithms. We document the superior behavior of nonlocal PINN with respect to local PINN in both solution accuracy and parameter inference.
arXiv Detail & Related papers (2020-05-31T06:26:21Z)

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