Physics-constrained Bayesian inference of state functions in classical density-functional theory

TL;DR

This paper introduces a Bayesian inference method constrained by physical principles to efficiently learn free energy functionals from experimental data in classical density-functional theory, providing accurate, interpretable results with quantified uncertainties.

Contribution

It presents a novel physics-constrained Bayesian framework for inferring free energy functionals, improving data efficiency and interpretability over traditional optimization-based machine learning methods.

Findings

Small data samples suffice for accurate functional inference.

The method accurately models excluded volume interactions.

Validated on one-dimensional fluid systems.

Abstract

We develop a novel data-driven approach to the inverse problem of classical statistical mechanics: given experimental data on the collective motion of a classical many-body system, how does one characterise the free energy landscape of that system? By combining non-parametric Bayesian inference with physically-motivated constraints, we develop an efficient learning algorithm which automates the construction of approximate free energy functionals. In contrast to optimisation-based machine learning approaches, which seek to minimise a cost function, the central idea of the proposed Bayesian inference is to propagate a set of prior assumptions through the model, derived from physical principles. The experimental data is used to probabilistically weigh the possible model predictions. This naturally leads to humanly interpretable algorithms with full uncertainty quantification of predictions. In our case, the output of the learning algorithm is a probability distribution over a family of free energy functionals, consistent with the observed particle data. We find that surprisingly small data samples contain sufficient information for inferring highly accurate analytic expressions of the underlying free energy functionals, making our algorithm highly data efficient. We consider excluded volume particle interactions, which are ubiquitous in nature, whilst being highly challenging for modelling in terms of free energy. To validate our approach we consider the paradigmatic case of one-dimensional fluid and develop inference algorithms for the canonical and grand-canonical statistical-mechanical ensembles. Extensions to higher-dimensional systems are conceptually straightforward, whilst standard coarse-graining techniques allow one to easily incorporate attractive interactions.