Universality in the Onset of Super-Diffusion in L\'evy Walks

Abstract

Anomalous dynamics in which local perturbations spread faster than diffusion are ubiquitously observed in the long-time behavior of a wide variety of systems. Here, the manner by which such systems evolve towards their asymptotic superdiffusive behavior is explored using the 1d L\'evy walk of order 1 < β < 2. The approach towards superdiffusion, as captured by the leading correction to the asymptotic behavior, is shown to remarkably undergo a transition as β crosses the critical value βc = 3/2. Above βc, this correction scales as x t1/2, describing simple diffusion. However, below βc it is instead found to remain superdiffusive, scaling as x t1/(2β-1). This transition is shown to be independent of the precise model details and is thus argued to be universal.