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FPAA-Based Realization of Filters with Fractional Laplace Operators of Different Orders

Stavroula Kapoulea, Costas Psychalinos, Ahmed S. Elwakil

2021Fractal and Fractional18 citationsDOIOpen Access PDF

Abstract

A simple and direct procedure for implementing fractional-order filters with transfer functions that contain Laplace operators of different fractional orders is presented in this work. Based on a general fractional-order transfer function that describes fractional-order low-pass, high-pass, band-pass, band-stop and all-pass filters, the introduced concept deals with the consideration of this function as a whole, with its approximation being performed using a curve-fitting-based technique. Compared to the conventional procedure, where each fractional-order Laplace operator of the transfer function is individually approximated, the main offered benefit is the significant reduction in the order of the resulting rational function. Experimental results, obtained using a field-programmable analog array device, verify the validity of this concept.

Topics & Concepts

Laplace transformTransfer functionRealization (probability)MathematicsOperator (biology)Field-programmable analog arrayFractional calculusFunction (biology)Applied mathematicsFilter (signal processing)Mathematical analysisMathematical optimizationComputer scienceTelecommunicationsEngineeringTransmission (telecommunications)Analog signalRepressorComputer visionChemistryStatisticsBiologyTranscription factorEvolutionary biologyElectrical engineeringBiochemistryGeneAnalog multiplierAdvanced Control Systems DesignAnalog and Mixed-Signal Circuit DesignDigital Filter Design and Implementation
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