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Power-law spectra from stochastic acceleration

Martin Lemoine, Mikhail Malkov

2020Monthly Notices of the Royal Astronomical Society30 citationsDOIOpen Access PDF

Abstract

ABSTRACT Numerical simulations of particle acceleration in magnetized turbulence have recently observed power-law spectra where pile-up distributions are rather expected. We interpret this as evidence for particle segregation based on acceleration rate, which is likely related to a non-trivial dependence of the efficacy of acceleration on phase space variables other than the momentum. We describe the corresponding transport in momentum space using continuous-time random walks, in which the time between two consecutive momentum jumps becomes a random variable. We show that power laws indeed emerge when the experimental (simulation) time-scale does not encompass the full extent of the distribution of waiting times. We provide analytical solutions, which reproduce dedicated numerical Monte Carlo realizations of the stochastic process, as well as analytical approximations. Our results can be readily extrapolated for applications to astrophysical phenomenology.

Topics & Concepts

PhysicsAccelerationStatistical physicsPower lawMonte Carlo methodStochastic processParticle accelerationMomentum (technical analysis)TurbulencePhase spacePhenomenology (philosophy)Position and momentum spaceConservation lawClassical mechanicsMechanicsQuantum mechanicsStatisticsEconomicsPhilosophyMathematicsEpistemologyFinanceSolar and Space Plasma DynamicsCosmology and Gravitation TheoriesClimate variability and models
Power-law spectra from stochastic acceleration | Litcius