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Lévy walk dynamics in an external harmonic potential

Pengbo Xu, Tian Zhou, Ralf Metzler, Weihua Deng

2020Physical review. E23 citationsDOIOpen Access PDF

Abstract

Lévy walks (LWs) are spatiotemporally coupled random-walk processes describing superdiffusive heat conduction in solids, propagation of light in disordered optical materials, motion of molecular motors in living cells, or motion of animals, humans, robots, and viruses. We here investigate a key feature of LWs-their response to an external harmonic potential. In this generic setting for confined motion we demonstrate that LWs equilibrate exponentially and may assume a bimodal stationary distribution. We also show that the stationary distribution has a horizontal slope next to a reflecting boundary placed at the origin, in contrast to correlated superdiffusive processes. Our results generalize LWs to confining forces and settle some longstanding puzzles around LWs.

Topics & Concepts

Random walkPhysicsMotion (physics)HarmonicClassical mechanicsStatistical physicsBoundary (topology)Dynamics (music)Thermal conductionHarmonic oscillatorMechanicsMathematical analysisQuantum mechanicsMathematicsAcousticsStatisticsDiffusion and Search Dynamicsstochastic dynamics and bifurcationAdvanced Thermodynamics and Statistical Mechanics