K. D. Lewandowska, Tadeusz Kosztołowicz
We study slow-subdiffusion in comparison to subdiffusion. Both of the processes are treated as random walks and can be described within continuous time random walk formalism. However, the probability density of the waiting time of a random walker to take its next step $\omega(t)$ is assumed over a long time limit in the form $\omega(t)\sim 1/t^{\alpha+1}$ for subdiffusion, and in the form $\omega(t)\sim h(t)/t$ for slow-subdiffusion [$h(t)$ is a slowly varying function]. We show that Green functions for slow-subdiffusion and subdiffusion can be very similar when the subdiffusion coefficient $D_\alpha$ depends on time. This creates the possibility of describing slow-subdiffusion by means of subdiffusion with a small value of the subdiffusion parameter $\alpha$, and the subdiffusion coefficient $D_\alpha$ varying over time.
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http://arxiv.org/abs/1301.4704
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