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Persistence in Brownian motion of an ellipsoidal particle in two dimensions

Anirban Ghosh, Dipanjan Chakraborty

2020The Journal of Chemical Physics10 citationsDOIOpen Access PDF

Abstract

We investigate the persistence probability p(t) of the position of a Brownian particle with shape asymmetry in two dimensions. The persistence probability is defined as the probability that a stochastic variable has not changed its sign in the given time interval. We explicitly consider two cases-diffusion of a free particle and that of a harmonically trapped particle. The latter is particularly relevant in experiments that use trapping and tracking techniques to measure the displacements. We provide analytical expressions of p(t) for both the scenarios and show that in the absence of the shape asymmetry, the results reduce to the case of an isotropic particle. The analytical expressions of p(t) are further validated against numerical simulation of the underlying overdamped dynamics. We also illustrate that p(t) can be a measure to determine the shape asymmetry of a colloid and the translational and rotational diffusivities can be estimated from the measured persistence probability. The advantage of this method is that it does not require the tracking of the orientation of the particle.

Topics & Concepts

Measure (data warehouse)Brownian motionStatistical physicsIsotropyAsymmetryPosition (finance)EllipsoidMathematicsParticle (ecology)Persistence (discontinuity)Sign (mathematics)Tracking (education)PhysicsVariable (mathematics)Probability distributionOrientation (vector space)Particle systemMathematical analysisClassical mechanicsStochastic processProbability measurePersistence lengthRandom variableParametric statisticsBreakupTerm (time)Stochastic modellingRotation (mathematics)RandomnessDiffusion and Search DynamicsMaterial Dynamics and Propertiesstochastic dynamics and bifurcation