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Numerical solution for a non-Fickian diffusion in a periodic potential
release_adwpww2nsvblbm3zifpfq4cwua
by
Adérito Araújo,
Amal K. Das,
Cidália Neves,
Ercília Sousa
Released
as a article
.
2011
Abstract
Numerical solutions of a non-Fickian diffusion equation belonging to a
hyperbolic type are presented in one space dimension. The Brownian particle
modelled by this diffusion equation is subjected to a symmetric periodic
potential whose spatial shape can be varied by a single parameter. We consider
a numerical method which consists of applying Laplace transform in time; we
then obtain an elliptic diffusion equation which is discretized using a finite
difference method. We analyze some aspects of the convergence of the method.
Numerical results for particle density, flux and mean-square-displacement
(covering both inertial and diffusive regimes) are presented.
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arXiv
1109.2344v1
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