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Title: Fractional telegrapher's equation from fractional persistent random walks
Author: Masoliver, Jaume, 1951-
Keywords: Processos estocàstics
Equacions diferencials lineals
Stochastic processes
Linear differential equations
Issue Date: 3-May-2016
Publisher: American Physical Society
Abstract: We generalize the telegrapher's equation to allow for anomalous transport. We derive the space-time fractional telegrapher's equation using the formalism of the persistent random walk in continuous time. We also obtain the characteristic function of the space-time fractional process and study some particular cases and asymptotic approximations. Similarly to the ordinary telegrapher's equation, the time-fractional equation also presents distinct behaviors for different time scales. Specifically, transitions between different subdiffusive regimes or from superdiffusion to subdiffusion are shown by the fractional equation as time progresses
Note: Reproducció del document publicat a:
It is part of: Physical Review E, 2016, vol. 93, num. 5, p. 052107-1-052107-10
ISSN: 1539-3755
Appears in Collections:Articles publicats en revistes (Física de la Matèria Condensada)

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