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Article

Fractional diffusion and wave equations

W. R. SchneiderAsea Brown Boveri Corporate Research, CH-5405 Baden, SwitzerlandWalter WyssDepartment of Physics, University of Colorado, Boulder, Colorado 80309
1989en
ABI

Abstract

Diffusion and wave equations together with appropriate initial condition(s) are rewritten as integrodifferential equations with time derivatives replaced by convolution with tα−1/Γ(α), α=1,2, respectively. Fractional diffusion and wave equations are obtained by letting α vary in (0,1) and (1,2), respectively. The corresponding Green’s functions are obtained in closed form for arbitrary space dimensions in terms of Fox functions and their properties are exhibited. In particular, it is shown that the Green’s function of fractional diffusion is a probability density.

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