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Anomalous diffusion originated by two Markovian hopping-trap mechanisms

Silvia Vitali, Paolo Paradisi, Gianni Pagnini

2022Journal of Physics A Mathematical and Theoretical20 citationsDOIOpen Access PDF

Abstract

Abstract We show through intensive simulations that the paradigmatic features of anomalous diffusion are indeed the features of a (continuous-time) random walk driven by two different Markovian hopping-trap mechanisms. If p ∈ (0, 1/2) and 1 − p are the probabilities of occurrence of each Markovian mechanism, then the anomalousness parameter β ∈ (0, 1) results to be β ≃ 1 − 1/{1 + log[(1 − p )/ p ]}. Ensemble and single-particle observables of this model have been studied and they match the main characteristics of anomalous diffusion as they are typically measured in living systems. In particular, the celebrated transition of the walker’s distribution from exponential to stretched-exponential and finally to Gaussian distribution is displayed by including also the Brownian yet non-Gaussian interval.

Topics & Concepts

Statistical physicsGaussianAnomalous diffusionBrownian motionDiffusionRandom walkMarkov processExponential functionExponential distributionPhysicsContinuous-time random walkDistribution (mathematics)Interval (graph theory)Markov chainMathematicsQuantum mechanicsStatisticsCombinatoricsMathematical analysisComputer scienceInnovation diffusionKnowledge managementFractional Differential Equations Solutionsstochastic dynamics and bifurcationDiffusion and Search Dynamics