Determination of a physically correct fractional‐order model for electrolytic computer‐grade capacitors

Electrolytic computer‐grade capacitors (ECGCs) are vastly implemented in energy storage systems. However, their models are not accurate and simple as other kinds of capacitors. For example, ECGCs and supercapacitors share many characteristics but have some differences because of their physicochemica...

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Veröffentlicht in:Mathematical methods in the applied sciences 2021-04, Vol.44 (6), p.4366-4380
Hauptverfasser: Cruz‐Duarte, Jorge M., Guía‐Calderón, Manuel, Rosales‐García, J. Juan, Correa, Rodrigo
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Sprache:eng
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Zusammenfassung:Electrolytic computer‐grade capacitors (ECGCs) are vastly implemented in energy storage systems. However, their models are not accurate and simple as other kinds of capacitors. For example, ECGCs and supercapacitors share many characteristics but have some differences because of their physicochemical properties, so it is wrong to assume their electrical behaviour is equivalent. In this work, we study the discharging response of ECGCs using four models obtained from fractional differential equations (FDEs) with integer initial conditions and causal fractional definitions, that is, Caputo and conformable operators. We also recall a correct procedure to achieve models from FDEs with physical consistency of units and avoiding additional and senseless constants. Thence, we perform a fitting procedure over an experimental dataset from six ECGCs via a hybrid solving procedure powered by the cuckoo search algorithm and interior‐point algorithm. Our results show that models based on the traditional ordinary differential equation give the worst description of discharge, while models containing the Mittag–Leffler function, with time to the power of fractional order as the argument, render the best description of ECGCs.
ISSN:0170-4214
1099-1476
DOI:10.1002/mma.7037