menu_book Explore the article's raw data

Gaussian processes for Bayesian inverse problems associated with linear partial differential equations

Abstract

This work is concerned with the use of Gaussian surrogate models for Bayesian inverse problems associated with linear partial differential equations. A particular focus is on the regime where only a small amount of training data is available. In this regime the type of Gaussian prior used is of critical importance with respect to how well the surrogate model will perform in terms of Bayesian inversion. We extend the framework of Raissi et. al. (2017) to construct PDE-informed Gaussian priors that we then use to construct different approximate posteriors. A number of different numerical experiments illustrate the superiority of the PDE-informed Gaussian priors over more traditional priors.

article Article

date_range 2024

language English

link Link of the paper

format_quote

Bai Tianming

Teckentrup Aretha

Zygalakis Konstantinos

Sorry! There is no raw data available for this article.

Loading references...

Loading citations...

Featured Keywords

Bayesian inverse problem

Gaussian process regression

MCMC

Surrogate model

shopping_basket PURCHASE DATA

Turn your research data into income-V2

Abstract

This study considers 4 experimental raw data and a survery of dataset. Stress-strain relationships of A1 and A2, R1 python file for distribution radar chart of Taguchi as a different variable data, and moment-curvature relationship of A1 were obtained. For the current study the fifth data of S1 was taken from a survey dataset of 500 responses. It is explained how the experimentally obtained raw data, code file of python and survery dataset are uploaded to the RDL platform.

article Article

date_range 2025

language English

link Link of the paper

Experimental test...

RC1 (mp4)