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Lévy dynamics of enhanced diffusion: Application to turbulence

Michael F. ShlesingerOffice of Naval Research, Physics Division, 800 North Quincy Street, Arlington, Virginia 22217Bruce J. WestOffice of Naval Research, Physics Division, 800 North Quincy Street, Arlington, Virginia 22217J. KlafterOffice of Naval Research, Physics Division, 800 North Quincy Street, Arlington, Virginia 22217
1987en
ABI

Abstract

We introduce a stochastic process called a L\'evy walk which is a random walk with a nonlocal memory coupled in space and in time in a scaling fashion. L\'evy walks result in enhanced diffusion, i.e., diffusion that grows as ${\mathrm{t}}^{\mathrm{\ensuremath{\alpha}}}$,\ensuremath{\alpha}>1. When applied to the description of a passive scalar diffusing in a fluctuating fluid flow the model generalizes Taylor's correlated-walk approach. It yields Richardson's ${\mathrm{t}}^{3}$ law for the turbulent diffusion of a passive scalar in a Kolmogorov -(5/3) homogeneous turbulent flow and also gives the deviations from the (5/3) exponent resulting from Mandelbrot's intermittency. The model can be extended to studies of chemical reactions in turbulent flow.

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