TL;DR
This paper presents a unified framework for analyzing and designing EIS inversion algorithms, introduces the generalized EIS inversion (gEISi) algorithm with improved accuracy, and demonstrates its effectiveness in handling complex distributions.
Contribution
The paper develops a comprehensive framework for EIS inversion algorithms and introduces the gEISi algorithm, enhancing distribution reconstruction accuracy and applicability.
Findings
gEISi accurately reproduces complex distributions
Framework clarifies features of effective EIS algorithms
gEISi is applicable to a wider range of models
Abstract
We introduce a framework for analyzing and designing EIS inversion algorithms. Our framework stems from the observation of four features common to well-defined EIS inversion algorithms, namely (1) the representation of unknown distributions, (2) the minimization of a metric of error to estimate parameters arising from the chosen representation, subject to constraints on (3) the complexity control parameters, and (4) a means for choosing optimal control parameter values. These features must be present to overcome the ill-posed nature of EIS inversion problems. We review three established EIS inversion algorithms to illustrate the pervasiveness of these features, and show the utility of the framework by resolving ambiguities concerning three more algorithms. Our framework is then used to design the generalized EIS inversion (gEISi) algorithm, which uses Gaussian basis function…
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