English

On the strong anomalous diffusion

chao-dyn 2009-10-31 v1 Chaotic Dynamics

Abstract

The superdiffusion behavior, i.e. <x2(t)>t2ν<x^2(t)> \sim t^{2 \nu}, with ν>1/2\nu > 1/2, in general is not completely characherized by a unique exponent. We study some systems exhibiting strong anomalous diffusion, i.e. <x(t)q>tqν(q)<|x(t)|^q> \sim t^{q \nu(q)} where ν(2)>1/2\nu(2)>1/2 and qν(q)q \nu(q) is not a linear function of qq. This feature is different from the weak superdiffusion regime, i.e. ν(q)=const>1/2\nu(q)=const > 1/2, as in random shear flows. The strong anomalous diffusion can be generated by nontrivial chaotic dynamics, e.g. Lagrangian motion in 2d2d time-dependent incompressible velocity fields, 2d2d symplectic maps and 1d1d intermittent maps. Typically the function qν(q)q \nu(q) is piecewise linear. This corresponds to two mechanisms: a weak anomalous diffusion for the typical events and a ballistic transport for the rare excursions. In order to have strong anomalous diffusion one needs a violation of the hypothesis of the central limit theorem, this happens only in a very narrow region of the control parameters space.

Keywords

Cite

@article{arxiv.chao-dyn/9811012,
  title  = {On the strong anomalous diffusion},
  author = {P. Castiglione and A. Mazzino and P. Muratore-Ginanneschi and A. Vulpiani},
  journal= {arXiv preprint arXiv:chao-dyn/9811012},
  year   = {2009}
}

Comments

27 pages, 14 figures