Fractional reaction-diffusion equations

A. Compte; A. Erdélyi; A. Erdélyi; A. Erdélyi; A. Erdélyi; A. Erdélyi; A. M. Mathai; A. Wiman; A.A. Kilbas; A.M. Mathai; A.M. Mathai; A.P. Prudnikov; B.I. Henry; B.I. Henry; B.I. Henry; C. Tsallis; C. Tsallis; D. Del-Castillo-Negrete; D. Del-Castillo-Negrete; E.M. Wright; E.M. Wright; E.M. Wright; G. Nicolis; H. Haken; H. J. Haubold; H. Wilhelmsson; H.J. Haubold; H.J. Haubold; J.D. Murray; K.B. Oldham; K.S. Miller; L. Debnath; M. Caputo; M.G. Mittag-Leffler; M.G. Mittag-Leffler; M.M. Dzherbashyan; M.M. Dzherbashyan; R. K. Saxena; R. Metzler; R. Metzler; R.K. Saxena; R.K. Saxena; R.K. Saxena; R.M. Kulsrud; S. Jespersen; S.G. Samko; W. Hundsdorfer; Y. Kuramoto

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Fractional reaction-diffusion equations

Abstract

In a series of papers, Saxena, Mathai, and Haubold (2002, 2004a, 2004b) derived solutions of a number of fractional kinetic equations in terms of generalized Mittag-Leffler functions which provide the extension of the work of Haubold and Mathai (1995, 2000). The subject of the present paper is to investigate the solution of a fractional reaction-diffusion equation. The results derived are of general nature and include the results reported earlier by many authors, notably by Jespersen, Metzler, and Fogedby (1999) for anomalous diffusion and del-Castillo-Negrete, Carreras, and Lynch (2003) for reaction-diffusion systems with L\'evy flights. The solution has been developed in terms of the H-function in a compact form with the help of Laplace and Fourier transforms. Most of the results obtained are in a form suitable for numerical computation.Comment: LaTeX, 17 pages, corrected typo

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