Please use this identifier to cite or link to this item: http://hdl.handle.net/10316/11247
Title: Finite difference approximations for a fractional advection diffusion problem
Authors: Sousa, Ercília 
Keywords: Fractional advection diffusion; Finite differences; Stability
Issue Date: 2008
Publisher: Centro de Matemática da Universidade de Coimbra
Citation: Pré-Publicações DMUC. 08-26 (2008)
Abstract: The use of the conventional advection diffusion equation in many physical situations has been questioned by many investigators in recent years and alternative diffusion models have been proposed. Fractional space derivatives are used to model anomalous diffusion or dispersion, where a particle plume spreads at a rate inconsistent with the classical Brownian motion model. When a fractional derivative replaces the second derivative in a diffusion or dispersion model, it leads to enhanced diffusion, also called superdiffusion. We consider a one dimensional advection-diffusion model, where the usual second-order derivative gives place to a fractional derivative of order , with 1 < ≤ 2. We derive explicit finite difference schemes which can be seen as generalizations of already existing schemes in the literature for the advection-diffusion equation. We present the order of accuracy of the schemes and in order to show its convergence we prove they are stable under certain conditions. In the end we present a test problem.
URI: http://hdl.handle.net/10316/11247
Rights: openAccess
Appears in Collections:FCTUC Matemática - Vários

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