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Numerical Solutions of Space-Fractional Advection–Diffusion–Reaction Equations

Valentina Salomoni, Nico De Marchi

2021Fractal and Fractional12 citationsDOIOpen Access PDF

Abstract

Background: solute transport in highly heterogeneous media and even neutron diffusion in nuclear environments are among the numerous applications of fractional differential equations (FDEs), being demonstrated by field experiments that solute concentration profiles exhibit anomalous non-Fickian growth rates and so-called “heavy tails”. Methods: a nonlinear-coupled 3D fractional hydro-mechanical model accounting for anomalous diffusion (FD) and advection–dispersion (FAD) for solute flux is described, accounting for a Riesz derivative treated through the Grünwald–Letnikow definition. Results: a long-tailed solute contaminant distribution is displayed due to the variation of flow velocity in both time and distance. Conclusions: a finite difference approximation is proposed to solve the problem in 1D domains, and subsequently, two scenarios are considered for numerical computations.

Topics & Concepts

Fractional calculusDiffusionAnomalous diffusionAdvectionNonlinear systemMathematicsComputationPhysicsTime derivativeFinite difference methodDispersion (optics)Mathematical analysisMechanicsThermodynamicsComputer scienceAlgorithmOpticsKnowledge managementQuantum mechanicsInnovation diffusionFractional Differential Equations SolutionsNumerical methods in engineeringProbabilistic and Robust Engineering Design
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