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Brownian motion under intermittent harmonic potentials

Ion Santra, Santanu Das, Sujit Kumar Nath

2021Journal of Physics A Mathematical and Theoretical55 citationsDOIOpen Access PDF

Abstract

Abstract We study the effects of an intermittent harmonic potential of strength μ = μ 0 ν —that switches on and off stochastically at a constant rate γ , on an overdamped Brownian particle with damping coefficient ν . This can be thought of as a realistic model for realisation of stochastic resetting. We show that this dynamics admits a stationary solution in all parameter regimes and compute the full time dependent variance for the position distribution and find the characteristic relaxation time. We find the exact non-equilibrium stationary state distributions in the limits—(i) γ ≪ μ 0 which shows a non-trivial distribution, in addition as μ 0 → ∞, we get back the result for resetting with refractory period; (ii) γ ≫ μ 0 where the particle relaxes to a Boltzmann distribution of an Ornstein–Uhlenbeck process with half the strength of the original potential and (iii) intermediate γ = 2 nμ 0 for n = 1, 2. The mean first passage time (MFPT) to find a target exhibits an optimisation with the switching rate, however unlike instantaneous resetting the MFPT does not diverge but reaches a stationary value at large rates. MFPT also shows similar behavior with respect to the potential strength. Our results can be verified in experiments on colloids using optical tweezers.

Topics & Concepts

Brownian motionFirst-hitting-time modelStationary distributionPosition (finance)PhysicsConstant (computer programming)Stationary stateStatistical physicsDistribution (mathematics)Initial value problemStochastic processHarmonicMathematicsHarmonic oscillatorDynamics (music)Mathematical analysisParticle (ecology)State (computer science)Relaxation (psychology)Boltzmann constantClassical mechanicsHarmonic potentialDistribution functionRest (music)Exponential functionSteady state (chemistry)Ornstein–Uhlenbeck processExponential decayGaussianBoltzmann distributionDiffusion and Search Dynamicsstochastic dynamics and bifurcationAdvanced Thermodynamics and Statistical Mechanics