Log-periodic modulation in one-dimensional random walks

L. Padilla; H. O. Mártin; J. L. Iguain

doi:10.1209/0295-5075/85/20008

Log-periodic modulation in one-dimensional random walks

Statistical Mechanics 2009-11-13 v1

Authors: L. Padilla , H. O. Mártin , J. L. Iguain

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Abstract

We have studied the diffusion of a single particle on a one-dimensional lattice. It is shown that, for a self-similar distribution of hopping rates, the time dependence of the mean-square displacement follows an anomalous power law modulated by logarithmic periodic oscillations. The origin of this modulation is traced to the dependence on the length of the diffusion coefficient. Both the random walk exponent and the period of the modulation are analytically calculated and confirmed by Monte Carlo simulations.

Keywords

random walk theory anomalous diffusion power-law distributions

Cite

@article{arxiv.0810.1882,
  title  = {Log-periodic modulation in one-dimensional random walks},
  author = {L. Padilla and H. O. Mártin and J. L. Iguain},
  journal= {arXiv preprint arXiv:0810.1882},
  year   = {2009}
}

Comments

6 pages, 7 figures

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