On physics-informed data-driven isotropic and anisotropic constitutive models through probabilistic machine learning and space-filling sampling

TL;DR

This paper introduces a physics-informed probabilistic machine learning approach using Gaussian process regression for data-driven isotropic and anisotropic constitutive models, capable of respecting physical laws and efficiently handling large datasets.

Contribution

It presents a novel GPR-based modeling framework that incorporates physical principles and a space-filling sampling method in invariant space, improving generalization and scalability.

Findings

GPR surrogates respect physical laws such as material symmetry and thermodynamics.

The approach shows high accuracy and generalization beyond training data.

First sampling method for space-filling points in invariant space.

Abstract

Data-driven constitutive modeling is an emerging field in computational solid mechanics with the prospect of significantly relieving the computational costs of hierarchical computational methods. Traditionally, these surrogates have been trained using datasets which map strain inputs to stress outputs directly. Data-driven constitutive models for elastic and inelastic materials have commonly been developed based on artificial neural networks (ANNs), which recently enabled the incorporation of physical laws in the construction of these models. However, ANNs do not offer convergence guarantees and are reliant on user-specified parameters. In contrast to ANNs, Gaussian process regression (GPR) is based on nonparametric modeling principles as well as on fundamental statistical knowledge and hence allows for strict convergence guarantees. GPR however has the major disadvantage that it scales poorly as datasets get large. In this work we present a physics-informed data-driven constitutive modeling approach for isostropic and anisotropic materials based on probabilistic machine learning that can be used in the big data context. The trained GPR surrogates are able to respect physical principles such as material frame indifference, material symmetry, thermodynamic consistency, stress-free undeformed configuration, and the local balance of angular momentum. Furthermore, this paper presents the first sampling approach that directly generates space-filling points in the invariant space corresponding to bounded domain of the gradient deformation tensor. Overall, the presented approach is tested on synthetic data from isotropic and anisotropic constitutive laws and shows surprising accuracy even far beyond the limits of the training domain, indicating that the resulting surrogates can efficiently generalize as they incorporate knowledge about the underlying physics.