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SIMULTANEOUS DETERMINATION OF A SOURCE TERM AND DIFFUSION CONCENTRATION FOR A MULTI-TERM SPACE-TIME FRACTIONAL DIFFUSION EQUATION

Salman A. Malik, Asim Ilyas, Arifa Samreen

2021Mathematical Modelling and Analysis29 citationsDOIOpen Access PDF

Abstract

An inverse problem of determining a time dependent source term along with diffusion/temperature concentration from a non-local over-specified condition for a space-time fractional diffusion equation is considered. The space-time fractional diffusion equation involve Caputo fractional derivative in space and Hilfer fractional derivatives in time of different orders between 0 and 1. Under certain conditions on the given data we proved that the inverse problem is locally well-posed in the sense of Hadamard. Our method of proof based on eigenfunction expansion for which the eigenfunctions (which are Mittag-Leffler functions) of fractional order spectral problem and its adjoint problem are considered. Several properties of multinomial Mittag-Leffler functions are proved.

Topics & Concepts

Fractional calculusMathematicsEigenfunctionMittag-Leffler functionTerm (time)Diffusion equationMathematical analysisDiffusionAnomalous diffusionSpace (punctuation)Hadamard transformInverse problemApplied mathematicsInverseEigenvalues and eigenvectorsPhysicsComputer scienceEconomyOperating systemThermodynamicsService (business)Innovation diffusionQuantum mechanicsEconomicsGeometryKnowledge managementFractional Differential Equations SolutionsNonlinear Differential Equations AnalysisNumerical methods in inverse problems