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Heat fluctuations in a harmonic chain of active particles

Deepak Gupta, David A. Sivak

2021Physical review. E24 citationsDOIOpen Access PDF

Abstract

One of the major challenges in stochastic thermodynamics is to compute the distributions of stochastic observables for small-scale systems for which fluctuations play a significant role. Hitherto much theoretical and experimental research has focused on systems composed of passive Brownian particles. In this paper, we study the heat fluctuations in a system of interacting active particles. Specifically we consider a one-dimensional harmonic chain of N active Ornstein-Uhlenbeck particles, with the chain ends connected to heat baths of different temperatures. We compute the moment-generating function for the heat flow in the steady state. We employ our general framework to explicitly compute the moment-generating function for two example single-particle systems. Further, we analytically obtain the scaled cumulants for the heat flow for the chain. Numerical Langevin simulations confirm the long-time analytical expressions for first and second cumulants for the heat flow for a two-particle chain.

Topics & Concepts

CumulantBrownian motionMoment (physics)Statistical physicsObservablePhysicsParticle (ecology)Flow (mathematics)HarmonicSteady state (chemistry)Function (biology)Langevin equationSecond moment of areaMechanicsClassical mechanicsThermodynamicsMathematicsQuantum mechanicsChemistryGeologyBiologyEvolutionary biologyOceanographyStatisticsPhysical chemistryAdvanced Thermodynamics and Statistical MechanicsMicro and Nano RoboticsMaterial Dynamics and Properties