Lattice Fractional Diffusion Equation in Terms of a Riesz-Caputo Difference
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Date
2015
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Volume Title
Publisher
Elsevier
Open Access Color
Green Open Access
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Abstract
A fractional difference is defined by the use of the right and the left Caputo fractional differences. The definition is a two-sided operator of Riesz type and introduces back and forward memory effects in space difference. Then, a fractional difference equation method is suggested for anomalous diffusion in discrete finite domains. A lattice fractional diffusion equation is proposed and the numerical simulation of the diffusion process is discussed for various difference orders. The result shows that the Riesz difference model is particularly suitable for modeling complicated dynamical behaviors on discrete media. (C) 2015 Elsevier B.V. All rights reserved.
Description
Wu, Guo-Cheng/0000-0002-1946-6770; Zeng, Shengda/0000-0003-1818-842X
Keywords
Discrete Fractional Calculus, Riesz-Caputo Difference, Fractional Partial Difference Equations, Difference equations, fractional partial difference equations, Fractional derivatives and integrals, Riesz-Caputo difference, Interacting random processes; statistical mechanics type models; percolation theory, discrete fractional calculus
Turkish CoHE Thesis Center URL
Fields of Science
0103 physical sciences, 0101 mathematics, 01 natural sciences
Citation
Wu, G.C...et al. (2015). Lattice fractional diffusion equation in terms of a Riesz-Caputo difference. Physica A-Statistical Mechanics And Its Applications, 438, 335-339. http://dx.doi.org/10.1016/j.physa.2015.06.024
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Q2
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Q1
OpenCitations Citation Count
62
Source
Physica A: Statistical Mechanics and its Applications
Volume
438
Issue
Start Page
335
End Page
339
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