Superdiffusive Dispersals Impart the Geometry of Underlying Random Walks.
作者: V. Zaburdaev , I. Fouxon , S. Denisov , E. Barkai
DOI: 10.1103/PHYSREVLETT.117.270601
关键词:
摘要: It is recognized now that a variety of real-life phenomena ranging from diffusion cold atoms to the motion humans exhibit dispersal faster than normal diffusion. L\'evy walks model excelled in describing such superdiffusive behaviors albeit one dimension. Here we show that, contrast standard random walks, microscopic geometry planar imprinted asymptotic distribution walkers. The underlying walk can be inferred trajectories walkers by calculating analogue Pearson coefficient.
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