Physics-informed solution reconstruction in elasticity and heat transfer using the explicit constraint force method

TL;DR

This paper introduces the explicit constraint force method (ECFM) for physics-informed solution reconstruction in elasticity and heat transfer, addressing issues of interpretability, robustness, and data consistency in PINNs when physics assumptions are inconsistent.

Contribution

The paper proposes ECFM to control constraint forces in physics-informed neural networks, improving solution predictability and robustness under inconsistent physics assumptions.

Findings

ECFM improves interpretability of reconstructed solutions.

ECFM enhances robustness against noisy data.

ECFM allows customizable reconstructions even with physics mismatch.

Abstract

One use case of ``physics-informed neural networks'' (PINNs) is solution reconstruction, which aims to estimate the full-field state of a physical system from sparse measurements. Parameterized governing equations of the system are used in tandem with the measurements to regularize the regression problem. However, in real-world solution reconstruction problems, the parameterized governing equation may be inconsistent with the physical phenomena that give rise to the measurement data. We show that due to assuming consistency between the true and parameterized physics, PINNs-based approaches may fail to satisfy three basic criteria of interpretability, robustness, and data consistency. As we argue, these criteria ensure that (i) the quality of the reconstruction can be assessed, (ii) the reconstruction does not depend strongly on the choice of physics loss, and (iii) that in certain situations, the physics parameters can be uniquely recovered. In the context of elasticity and heat transfer, we demonstrate how standard formulations of the physics loss and techniques for constraining the solution to respect the measurement data lead to different ``constraint forces" -- which we define as additional source terms arising from the constraints -- and that these constraint forces can significantly influence the reconstructed solution. To avoid the potentially substantial influence of the choice of physics loss and method of constraint enforcement on the reconstructed solution, we propose the ``explicit constraint force method'' (ECFM) to gain control of the source term introduced by the constraint. We then show that by satisfying the criteria of interpretability, robustness, and data consistency, this approach leads to more predictable and customizable reconstructions from noisy measurement data, even when the parameterization of the missing physics is inconsistent with the measured system.