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Numerical exploration of thin film flow of MHD pseudo-plastic fluid in fractional space: Utilization of fractional calculus approach

Mubashir Qayyum, Farnaz Ismail, Muhammad Umer Sohail, Naveed Imran, Sameh Askar, Choonkil Park

2021Open Physics28 citationsDOIOpen Access PDF

Abstract

Abstract In this article, thin film flow of non-Newtonian pseudo-plastic fluid is investigated on a vertical wall through homotopy-based scheme along with fractional calculus. Three cases were examined after considering (i) partial fractional differential equation (PFDE) by altering first-order derivative to fractional derivative in the interval (0, 1), (ii) PFDE by altering second-order derivative to fractional derivative in the interval (1, 2), and (iii) fully FDE by altering first-order derivative to fractional derivative in (0, 1) and second-order derivative to fractional derivative in (1, 2). Different physical quantities such as the velocity profile and volume flux were computed and analyzed. Validity of obtained results was checked by finding residuals. Moreover, consequence of different parameters on the velocity were also explored in fractional space.

Topics & Concepts

Fractional calculusDerivative (finance)Generalizations of the derivativeMathematicsMathematical analysisInterval (graph theory)Space (punctuation)Order (exchange)MagnetohydrodynamicsMaterial derivativeFréchet derivativeFlow (mathematics)Calculus (dental)PhysicsGeometryCombinatoricsComputer scienceMedicineFinanceDentistryBanach spaceEconomicsOperating systemFinancial economicsPlasmaQuantum mechanicsFractional Differential Equations SolutionsNanofluid Flow and Heat TransferFluid Dynamics and Thin Films
Numerical exploration of thin film flow of MHD pseudo-plastic fluid in fractional space: Utilization of fractional calculus approach | Litcius