Fisher-Information-Based Sensor Placement for Structural Digital Twins: Analytic Results and Benchmarks

TL;DR

This paper introduces a Fisher-information-based framework for optimal sensor placement in structural digital twins, enhancing the accuracy and stability of inverse problem solutions through rigorous mathematical and computational methods.

Contribution

It develops a comprehensive, implementation-ready approach for sensor placement using Fisher information and D-optimal design, including explicit formulas and analytical benchmarks.

Findings

Matrix-free Jacobian and adjoint operator formulas enable efficient computations.

Explicit sensitivity expressions facilitate practical sensor placement strategies.

Analytical results for a 1D model demonstrate uniform sensor spacing for optimal detection.

Abstract

High-fidelity digital twins rely on the accurate assimilation of sensor data into physics-based computational models. In structural applications, such twins aim to identify spatially distributed quantities--such as elementwise weakening fields, material parameters, or effective thermal loads--by minimizing discrepancies between measured and simulated responses subject to the governing equations of structural mechanics. While adjoint-based methods enable efficient gradient computation for these inverse problems, the quality and stability of the resulting estimates depend critically on the choice of sensor locations, measurement types, and directions. This paper develops a rigorous and implementation-ready framework for Fisher-information-based sensor placement in adjoint-based finite-element digital twins. Sensor configurations are evaluated using a D-optimal design criterion derived from a linearization of the measurement map, yielding a statistically meaningful measure of information content. We present matrix-free operator formulas for applying the Jacobian and its adjoint, and hence for computing Fisher-information products $Fv = J^\top R^{-1} Jv$ using only forward and adjoint solves. Building on these operator evaluations, we derive explicit sensitivity expressions for D-optimal sensor design with respect to measurement parameters and discuss practical strategies for evaluating the associated log-determinant objectives. To complement the general framework, we provide analytically tractable sensor placement results for a canonical one-dimensional structural model, clarifying the distinction between detectability and localizability and proving that D-optimal placement of multiple displacement sensors yields approximately uniform spacing.