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Energy current correlation in solvable long-range interacting systems

Shuji Tamaki, Keiji Saito

2020Physical review. E31 citationsDOIOpen Access PDF

Abstract

We consider heat transfer in one-dimensional systems with long-range interactions. It is known that typical short-range interacting systems shows anomalous behavior in heat transport when total momentum is conserved, whereas momentum-nonconserving systems do not exhibit anomaly. In this study, we focus on the effect of long-range interaction. We propose an exactly solvable model that reduces to the so-called momentum-exchange model in the short-range interaction limit. We exactly calculate the asymptotic time decay in the energy current correlation function, which is related to the thermal conductivity via the Green-Kubo formula. From the time decay of the current correlation, we show three qualitatively crucial results. First, the anomalous exponent in the time-decay continuously changes as a function of the index of the long-range interaction. Second, there is a regime where the current correlation diverges with increasing the system size with fixed time, and hence, the exponent of the time decay cannot be defined. Third, even momentum-nonconserving systems can show the anomalous exponent indicating anomalous heat transport. Higher dimensions are also considered, and we found that long-range interaction can induce the anomalous exponent even in three-dimensional systems.

Topics & Concepts

ExponentPhysicsMomentum (technical analysis)Range (aeronautics)Current (fluid)Anomaly (physics)Correlation function (quantum field theory)ScalingStatistical physicsFunction (biology)Quantum electrodynamicsCondensed matter physicsQuantum mechanicsMathematicsThermodynamicsMaterials scienceEvolutionary biologyDielectricPhilosophyEconomicsComposite materialBiologyFinanceGeometryLinguisticsThermal properties of materialsAdvanced Thermodynamics and Statistical MechanicsThermal Radiation and Cooling Technologies