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An effective computational approach to the local fractional low-pass electrical transmission lines model

Kang‐Jia Wang

2024Alexandria Engineering Journal47 citationsDOIOpen Access PDF

Abstract

In this research, a new fractional low-pass electrical transmission lines model (LPETLM) described by the local fractional derivative (LFD) is derived for the first time. By defining the Mittag-Leffler function (MLF) on the Cantor set (CS), two special functions, namely, the L T δ -function and L C δ -function, are extracted to develop an auxiliary function, which is employed to look for the non-differentiable (ND) exact solutions (ESs) together with Yang’s non-differentiable transformation. Eight sets of the ESs are obtained and the corresponding dynamic performances on the CS for γ = ln 2 / ln 3 are displayed. As expected, for γ → 1 , the ESs of the local fractional LPETLM become the ESs of the classic LPETLM and the outlines are also depicted graphically. The outcomes confirm that our new method is a promising tool to handle the local fractional PDEs in the electrical and electronic engineering.

Topics & Concepts

Electric power transmissionTransmission (telecommunications)Fractional calculusControl theory (sociology)Electronic engineeringMathematicsMathematical optimizationComputer scienceApplied mathematicsEngineeringTelecommunicationsElectrical engineeringArtificial intelligenceControl (management)Electromagnetic Scattering and AnalysisFractional Differential Equations SolutionsNumerical methods for differential equations