2013
DOI: 10.1002/mma.2753
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A nonperturbative solution of the nonlinear BBGKY hierarchy for marginal correlation operators

Abstract: Communicated by M. A. LachowiczWe consider the problem of the rigorous description of nonequilibrium quantum correlations. Within the framework of an alternative approach to the description of the evolution of states of finitely many particles in terms of correlation operators governed by the von Neumann hierarchy, we derive the nonlinear quantum Bogoliubov-Born-Green-Kirkwood-Yvon (BBGKY) hierarchy for marginal correlation operators that is adopted to the description of quantum infinite-particle systems as we… Show more

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Cited by 8 publications
(32 citation statements)
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“…Thus, in case of initial states specified by one-particle (marginal) density operator (23) we establish that the dual quantum Vlasov hierarchy (19) for additive-type marginal observables describes the evolution of a quantum large particle system just as the non-Markovian quantum Vlasov-type kinetic equation with initial correlations (26).…”
Section: The Quantum Vlasov-type Kinetic Equation With Initial Correlmentioning
confidence: 80%
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“…Thus, in case of initial states specified by one-particle (marginal) density operator (23) we establish that the dual quantum Vlasov hierarchy (19) for additive-type marginal observables describes the evolution of a quantum large particle system just as the non-Markovian quantum Vlasov-type kinetic equation with initial correlations (26).…”
Section: The Quantum Vlasov-type Kinetic Equation With Initial Correlmentioning
confidence: 80%
“…It should be noted that equations set (19) has the structure of recurrence evolution equations. We give several examples of the evolution equations of the dual quantum Vlasov hierarchy (19) in terms of operator kernels of the limit marginal observables…”
Section: ) Of Limit Marginal Observables (17) Is a Generalized Glomentioning
confidence: 99%
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