Francis N. C. Paraan, J. P. Esguerra
Published 2006-03-20, updated 2006-07-03Version 2
We present a continuous time generalization of a random walk with complete memory of its history [Phys. Rev. E 70, 045101(R) (2004)] and derive exact expressions for the first four moments of the distribution of displacement when the number of steps is Poisson distributed. We analyze the asymptotic behavior of the normalized third and fourth cumulants and identify new transitions in a parameter regime where the random walk exhibits superdiffusion. These transitions, which are also present in the discrete time case, arise from the memory of the process and are not reproduced by Fokker-Planck approximations to the evolution equation of this random walk.
Comments: Revtex4, 10 pages, 2 figures. v2: applications discussed, clarity improved, corrected scaling of third moment
Journal: Phys. Rev. E 74, 032101 (2006)
Continuous time random walk, Mittag-Leffler waiting time and fractional diffusion: mathematical aspects
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Continuous Time Random Walk in a velocity field: Role of domain growth, Galilei-invariant advection-diffusion, and kinetics of particle mixing
