 Numerical study of strong anomalous diffusionP Castiglione, A Mazzino and P Muratore-Ginanneschi Physica A: Statistical Mechanics and its Applications, 2000, vol. 280, issue 1, 60-68 Abstract: The superdiffusion behavior, i.e., 〈x2(t)〉∼t2ν, with ν>1/2, in general is not completely characterized by a unique exponent. We study some systems exhibiting strong anomalous diffusion, i.e., 〈|x(t)|q〉∼tqν(q) where ν(2)>1/2 and qν(q) is not a linear function of q. This feature is different from the weak superdiffusion regime, i.e., ν(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 2d time-dependent incompressible velocity fields, 2d symplectic maps and 1d intermittent maps. Typically the function qν(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. In the presence of strong anomalous diffusion one does not have a unique exponent and therefore one has the failure of the usual scaling of the probability distribution, i.e., P(x,t)=t−νF(x/tν). This implies that the effective equation at large scale and long time for P(x,t), can obey neither the usual Fick equation nor other linear equations involving temporal and/or spatial fractional derivatives. Date: 2000 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:eee:phsmap:v:280:y:2000:i:1:p:60-68 DOI: 10.1016/S0378-4371(99)00618-4 Access Statistics for this article Physica A: Statistical Mechanics and its Applications is currently edited by K. A. Dawson, J. O. Indekeu, H.E. Stanley and C. Tsallis More articles in Physica A: Statistical Mechanics and its Applications from Elsevier |
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