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Active Ornstein–Uhlenbeck model for self-propelled particles with inertia

G H Philipp Nguyen, René Wittmann, Hartmut Löwen

2021Journal of Physics Condensed Matter63 citationsDOIOpen Access PDF

Abstract

Self-propelled particles, which convert energy into mechanical motion, exhibit inertia if they have a macroscopic size or move inside a gaseous medium, in contrast to micron-sized overdamped particles immersed in a viscous fluid. Here we study an extension of the active Ornstein-Uhlenbeck model, in which self-propulsion is described by colored noise, to access these inertial effects. We summarize and discuss analytical solutions of the particle's mean-squared displacement and velocity autocorrelation function for several settings ranging from a free particle to various external influences, like a linear or harmonic potential and coupling to another particle via a harmonic spring. Taking into account the particular role of the initial particle velocity in a nonstationary setup, we observe all dynamical exponents between zero and four. After the typical inertial time, determined by the particle's mass, the results inherently revert to the behavior of an overdamped particle with the exception of the harmonically confined systems, in which the overall displacement is enhanced by inertia. We further consider an underdamped model for an active particle with a time-dependent mass, which critically affects the displacement in the intermediate time-regime. Most strikingly, for a sufficiently large rate of mass accumulation, the particle's motion is completely governed by inertial effects as it remains superdiffusive for all times.

Topics & Concepts

InertiaPhysicsInertial frame of referenceClassical mechanicsDisplacement (psychology)Particle (ecology)AutocorrelationMechanicsFictitious forceParticle displacementHarmonicDynamics (music)Simple harmonic motionScalingHarmonic potentialHarmonic oscillatorStatistical physicsCoupling (piping)Magnetosphere particle motionDissipationPotential energyExponentMoment of inertiaCenter of mass (relativistic)Explosive materialMicro and Nano Roboticsstochastic dynamics and bifurcationAdvanced Thermodynamics and Statistical Mechanics