Related papers: Comparing analytic and data-driven approaches to parameter identifiability: A power systems case study

Comparing analytic and data-driven approaches to parameter identifiability: A power systems case study

URL: http://arxiv.org/abs/2412.18663v1
Date: Tue, 24 Dec 2024 19:33:12 GMT
Title: Comparing analytic and data-driven approaches to parameter identifiability: A power systems case study
Authors: Nikolaos Evangelou, Alexander M. Stankovic, Ioannis G. Kevrekidis, Mark K. Transtrum,
Abstract summary: We report on a study comparing and contrasting analytical and data-driven approaches to quantify parameter identifiability. We use the infinite bus synchronous generator model, a well-understood model from the power systems domain, as our benchmark problem. We compare these results to those arrived at through data-driven manifold learning schemes: Output Diffusion - Maps and Geometric Harmonics.
Score: 41.94295877935867
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Abstract: Parameter identifiability refers to the capability of accurately inferring the parameter values of a model from its observations (data). Traditional analysis methods exploit analytical properties of the closed form model, in particular sensitivity analysis, to quantify the response of the model predictions to variations in parameters. Techniques developed to analyze data, specifically manifold learning methods, have the potential to complement, and even extend the scope of the traditional analytical approaches. We report on a study comparing and contrasting analytical and data-driven approaches to quantify parameter identifiability and, importantly, perform parameter reduction tasks. We use the infinite bus synchronous generator model, a well-understood model from the power systems domain, as our benchmark problem. Our traditional analysis methods use the Fisher Information Matrix to quantify parameter identifiability analysis, and the Manifold Boundary Approximation Method to perform parameter reduction. We compare these results to those arrived at through data-driven manifold learning schemes: Output - Diffusion Maps and Geometric Harmonics. For our test case, we find that the two suites of tools (analytical when a model is explicitly available, as well as data-driven when the model is lacking and only measurement data are available) give (correct) comparable results; these results are also in agreement with traditional analysis based on singular perturbation theory. We then discuss the prospects of using data-driven methods for such model analysis.

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