Related papers: Discovery of partial differential equations from highly noisy and sparse data with physics-informed information criterion

Discovery of partial differential equations from highly noisy and sparse data with physics-informed information criterion

URL: http://arxiv.org/abs/2208.03322v1
Date: Fri, 5 Aug 2022 02:40:37 GMT
Title: Discovery of partial differential equations from highly noisy and sparse data with physics-informed information criterion
Authors: Hao Xu, Junsheng Zeng, Dongxiao Zhang
Abstract summary: A physics-informed information criterion (PIC) is proposed to measure the parsimony and precision of the discovered PDE synthetically. The proposed PIC achieves highly noisy and sparse data on seven canonical PDEs from different physical scenes. The results show that the discovered macroscale PDE is precise and parsimonious, and satisfies underlying symmetries.
Score: 2.745859263816099
License: http://creativecommons.org/licenses/by-nc-nd/4.0/
Abstract: Data-driven discovery of PDEs has made tremendous progress recently, and many canonical PDEs have been discovered successfully for proof-of-concept. However, determining the most proper PDE without prior references remains challenging in terms of practical applications. In this work, a physics-informed information criterion (PIC) is proposed to measure the parsimony and precision of the discovered PDE synthetically. The proposed PIC achieves state-of-the-art robustness to highly noisy and sparse data on seven canonical PDEs from different physical scenes, which confirms its ability to handle difficult situations. The PIC is also employed to discover unrevealed macroscale governing equations from microscopic simulation data in an actual physical scene. The results show that the discovered macroscale PDE is precise and parsimonious, and satisfies underlying symmetries, which facilitates understanding and simulation of the physical process. The proposition of PIC enables practical applications of PDE discovery in discovering unrevealed governing equations in broader physical scenes.

Related papers

Multimodal Policies with Physics-informed Representations [3.0253681238542076]
In the control problems of the PDE systems, observation is important to make the decision. We propose a Physics-Informed Representation (PIR) algorithm for multimodal policies in PDE systems' control.
arXiv Detail & Related papers (2024-10-20T01:56:15Z)
Adaptation of uncertainty-penalized Bayesian information criterion for parametric partial differential equation discovery [1.1049608786515839]
We introduce an extension of the uncertainty-penalized Bayesian information criterion (UBIC) to solve parametric PDE discovery problems efficiently. UBIC uses quantified PDE uncertainty over different temporal or spatial points to prevent overfitting in model selection. We show that our extended UBIC can identify the true number of terms and their varying coefficients accurately, even in the presence of noise.
arXiv Detail & Related papers (2024-08-15T12:10:50Z)
Unisolver: PDE-Conditional Transformers Are Universal PDE Solvers [55.0876373185983]
We present the Universal PDE solver (Unisolver) capable of solving a wide scope of PDEs. Our key finding is that a PDE solution is fundamentally under the control of a series of PDE components. Unisolver achieves consistent state-of-the-art results on three challenging large-scale benchmarks.
arXiv Detail & Related papers (2024-05-27T15:34:35Z)
Deep Equilibrium Based Neural Operators for Steady-State PDEs [100.88355782126098]
We study the benefits of weight-tied neural network architectures for steady-state PDEs. We propose FNO-DEQ, a deep equilibrium variant of the FNO architecture that directly solves for the solution of a steady-state PDE.
arXiv Detail & Related papers (2023-11-30T22:34:57Z)
Solving High-Dimensional PDEs with Latent Spectral Models [74.1011309005488]
We present Latent Spectral Models (LSM) toward an efficient and precise solver for high-dimensional PDEs. Inspired by classical spectral methods in numerical analysis, we design a neural spectral block to solve PDEs in the latent space. LSM achieves consistent state-of-the-art and yields a relative gain of 11.5% averaged on seven benchmarks.
arXiv Detail & Related papers (2023-01-30T04:58:40Z)
Differentiable Invariant Causal Discovery [106.87950048845308]
Learning causal structure from observational data is a fundamental challenge in machine learning. This paper proposes Differentiable Invariant Causal Discovery (DICD) to avoid learning spurious edges and wrong causal directions. Extensive experiments on synthetic and real-world datasets verify that DICD outperforms state-of-the-art causal discovery methods up to 36% in SHD.
arXiv Detail & Related papers (2022-05-31T09:29:07Z)
Lie Point Symmetry Data Augmentation for Neural PDE Solvers [69.72427135610106]
We present a method, which can partially alleviate this problem, by improving neural PDE solver sample complexity. In the context of PDEs, it turns out that we are able to quantitatively derive an exhaustive list of data transformations. We show how it can easily be deployed to improve neural PDE solver sample complexity by an order of magnitude.
arXiv Detail & Related papers (2022-02-15T18:43:17Z)
Discovering Nonlinear PDEs from Scarce Data with Physics-encoded Learning [11.641708412097659]
We propose a physics-encoded discrete learning framework for discovering PDEs from noisy and scarce data. We validate our method on three nonlinear PDE systems.
arXiv Detail & Related papers (2022-01-28T07:49:48Z)
Physics-Informed Neural Operator for Learning Partial Differential Equations [55.406540167010014]
PINO is the first hybrid approach incorporating data and PDE constraints at different resolutions to learn the operator. The resulting PINO model can accurately approximate the ground-truth solution operator for many popular PDE families.
arXiv Detail & Related papers (2021-11-06T03:41:34Z)
A composable autoencoder-based iterative algorithm for accelerating numerical simulations [0.0]
CoAE-MLSim is an unsupervised, lower-dimensional, local method that is motivated from key ideas used in commercial PDE solvers. It is tested for a variety of complex engineering cases to demonstrate its computational speed, accuracy, scalability, and generalization across different PDE conditions.
arXiv Detail & Related papers (2021-10-07T20:22:37Z)
APIK: Active Physics-Informed Kriging Model with Partial Differential Equations [6.918364447822299]
We present a PDE Informed Kriging model (PIK), which introduces PDE information via a set of PDE points and conducts posterior prediction similar to the standard kriging method. To further improve learning performance, we propose an Active PIK framework (APIK) that designs PDE points to leverage the PDE information based on the PIK model and measurement data.
arXiv Detail & Related papers (2020-12-22T02:31:26Z)

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