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An operator derivation of the Feynman–Vernon theory, with applications to the generating function of bath energy changes and to an-harmonic baths

Erik Aurell, Ryoichi Kawai, Ketan Goyal

2020Journal of Physics A Mathematical and Theoretical21 citationsDOIOpen Access PDF

Abstract

Abstract We present a derivation of the Feynman–Vernon approach to open quantum systems in the language of super-operators. We show that this gives a new and more direct derivation of the generating function of energy changes in a bath, or baths. As found previously, this generating function is given by a Feynman–Vernon-like influence functional, with only time shifts in the kernels coupling the forward and backward paths. We further show that the new approach extends to an-harmonic and possible non-equilibrium baths, provided that the interactions are bi-linear, and that the baths do not interact between themselves. Such baths are characterized by non-trivial cumulants. Every non-zero cumulant of certain environment correlation functions is thus a kernel in a higher-order term in the Feynman–Vernon action.

Topics & Concepts

Feynman diagramOperator (biology)CumulantKernel (algebra)HarmonicMathematicsQuantumMathematical physicsGenerating functionCoupling (piping)Function (biology)PhysicsStatistical physicsQuantum mechanicsPure mathematicsMathematical analysisStatisticsBiochemistryMechanical engineeringTranscription factorGeneChemistryRepressorBiologyEngineeringEvolutionary biologyAdvanced Thermodynamics and Statistical MechanicsSpectroscopy and Quantum Chemical StudiesQuantum Information and Cryptography
An operator derivation of the Feynman–Vernon theory, with applications to the generating function of bath energy changes and to an-harmonic baths | Litcius