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Analysis on determining the solution of fourth-order fuzzy initial value problem with Laplace operator

Muhammad Akram, Tayyaba Ihsan, Tofigh Allahviranloo, Mohammed M. Ali Al-Shamiri

2022Mathematical Biosciences & Engineering16 citationsDOIOpen Access PDF

Abstract

This study presents a new analytical method to extract the fuzzy solution of the fuzzy initial value problem (FIVP) of fourth-order fuzzy ordinary differential equations (FODEs) using the Laplace operator under the strongly generalized Hukuhara differentiability (SGH-differentiability). To this end, firstly the fourth-order derivative of the fuzzy valued function (FVF) according to the type of the SGH-differentiability is introduced, and then the relationships between the fourth-order derivative of the FVF and its Laplace transform are established. Furthermore, considering the types of differentiabilities and switching points, some fundamental theorems related to the Laplace transform of the fourth-order derivative of the FVF are stated and proved in detail and a method to solve FIVP by the fuzzy Laplace transform is presented in detail. An application of our proposed method in Resistance-Inductance circuit (RL circuit) is presented. Finally, FIVP's solution is graphically analyzed to visualize and support theoretical results.

Topics & Concepts

MathematicsLaplace transformDifferentiable functionFuzzy logicApplied mathematicsLaplace transform applied to differential equationsOperator (biology)Mellin transformOrder (exchange)Two-sided Laplace transformInverse Laplace transformDerivative (finance)Mathematical analysisComputer scienceFractional Fourier transformFourier transformChemistryBiochemistryFinancial economicsRepressorTranscription factorArtificial intelligenceGeneFourier analysisFinanceEconomicsFuzzy Systems and OptimizationMulti-Criteria Decision MakingFractional Differential Equations Solutions
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