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Symbolic Representation for Analog Realization of A Family of Fractional Order Controller Structures via Continued Fraction Expansion

dc.contributor.authorPakhira, A
dc.contributor.authorDas, S
dc.contributor.authorPan, I
dc.contributor.authorDas, S
dc.date.accessioned2018-01-22T10:47:42Z
dc.date.issued2015-02-07
dc.description.abstractThis paper uses the Continued Fraction Expansion (CFE) method for analog realization of fractional order differ-integrator and few special classes of fractional order (FO) controllers viz. Fractional Order Proportional-Integral-Derivative (FOPID) controller, FO[PD] controller and FO lead-lag compensator. Contemporary researchers have given several formulations for rational approximation of fractional order elements. However, approximation of the controllers studied in this paper, due to having fractional power of a rational transfer function, is not available in analog domain; although its digital realization already exists. This motivates us for applying CFE based analog realization technique for complicated FO controller structures to get equivalent rational transfer functions in terms of the controller tuning parameters. The symbolic expressions for rationalized transfer function in terms of the controller tuning parameters are especially important as ready references, without the need of running CFE algorithm every time and also helps in the synthesis of analog circuits for such FO controllers.en_GB
dc.identifier.citationVol. 57, July 2015, pp. 390-402en_GB
dc.identifier.doi10.1016/j.isatra.2015.01.007
dc.identifier.urihttp://hdl.handle.net/10871/31141
dc.language.isoenen_GB
dc.publisherElsevieren_GB
dc.subjectAnalog realizationen_GB
dc.subjectContinued fraction expansion (CFE)en_GB
dc.subjectDomino-ladderen_GB
dc.subjectFractional order controlleren_GB
dc.subjectFO[PD] controlleren_GB
dc.subjectFO lead–lag compensatoren_GB
dc.subjectSymbolic realizationen_GB
dc.titleSymbolic Representation for Analog Realization of A Family of Fractional Order Controller Structures via Continued Fraction Expansionen_GB
dc.typeArticleen_GB
dc.date.available2018-01-22T10:47:42Z
dc.identifier.issn0019-0578
dc.descriptionThis is the author accepted manuscript. The final version is available from Elsevier via the DOI in this record.en_GB
dc.identifier.eissn1879-2022
dc.identifier.journalISA Transactionsen_GB


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