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Generic transport formula for a system driven by Markovian reservoirs

Tony Jin, Michele Filippone, Thierry Giamarchi

2020Physical review. B./Physical review. B46 citationsDOIOpen Access PDF

Abstract

We present a generic, compact formula for the current flowing in interacting and noninteracting systems which are driven out of equilibrium by biased reservoirs described by Lindblad jump operators. We show that, in the limit of high temperature and chemical potential, our formula is equivalent to the well-known Meir-Wingreen formula, which describes the current flowing through a system connected to fermionic baths, therefore bridging the gap between the two formalisms. Our formulation gives a systematic way to address the transport properties of correlated systems strongly driven out of equilibrium. As an illustration, we provide explicit calculations of the current in three cases : (i) a single-site impurity, (ii) a free-fermionic chain, and (iii) a fermionic chain with loss and gain terms along the chain. In this last case, we find that the current across the system has the same behavior for loss or gain terms and depends on the loss/gain rate in a nonmonotonic way.

Topics & Concepts

Rotation formalisms in three dimensionsStatistical physicsCurrent (fluid)JumpLimit (mathematics)Markov processMarkov chainPhysicsMaster equationChain (unit)MathematicsThermodynamicsQuantum mechanicsMathematical analysisStatisticsGeometryQuantumQuantum and electron transport phenomenaQuantum many-body systemsAdvanced Thermodynamics and Statistical Mechanics
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