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The fractal active low-pass filter within the local fractional derivative on the Cantor set

Kang‐Jia Wang

2023COMPEL The International Journal for Computation and Mathematics in Electrical and Electronic Engineering46 citationsDOI

Abstract

Purpose The purpose of this paper is to derive a new fractal active low-pass filter (LPF) within the local fractional derivative (LFD) calculus on the Cantor set (CS). Design/methodology/approach To the best of the author’s knowledge, a new fractal active LPF within the LFD on the CS is proposed for the first time in this work. By defining the nondifferentiable (ND) lumped elements on the fractal set, the author successfully extracted its ND transfer function by applying the local fractional Laplace transform. The properties of the ND transfer function on the CS are elaborated in detail. Findings The comparative results between the fractal active LPF (for γ = ln2/ln3) and the classic one (for γ = 1) on the amplitude–frequency and phase–frequency characteristics show that the proposed method is correct and effective, and is expected to shed light on the theory study of the fractal electrical systems. Originality/value To the best of the author’s knowledge, the fractal active LPF within the LFD calculus on the CS is proposed for the first time in this study. The proposed method can be used to study the other problems in the fractal electrical systems, and is expected to shed a light on the theory study of the fractal electrical systems.

Topics & Concepts

FractalTransfer functionCantor setLaplace transformFractional calculusMathematicsFractal derivativeMathematical analysisFilter (signal processing)Set (abstract data type)Calculus (dental)Computer scienceFractal analysisPure mathematicsFractal dimensionDentistryMedicineComputer visionEngineeringProgramming languageElectrical engineeringFractional Differential Equations SolutionsMechanical and Optical ResonatorsPower Quality and Harmonics
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