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Quantum maximum-entropy principle for closed quantum hydrodynamic transport within a Wigner function formalism

Journal Article · · Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics (Print)
 [1];  [2]
  1. Dipartimento di Matematica, Universita di Catania, Viale A. Doria, I-95125 Catania (Italy)
  2. Dipartimento di Ingegneria dell' Innovazione and CNISM, Universita del Salento, Via Arnesano s/n, I-73100 Lecce (Italy)
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By introducing a quantum entropy functional of the reduced density matrix, the principle of quantum maximum entropy is asserted as fundamental principle of quantum statistical mechanics. Accordingly, we develop a comprehensive theoretical formalism to construct rigorously a closed quantum hydrodynamic transport within a Wigner function approach. The theoretical formalism is formulated in both thermodynamic equilibrium and nonequilibrium conditions, and the quantum contributions are obtained by only assuming that the Lagrange multipliers can be expanded in powers of ({h_bar}/2{pi}){sup 2}. In particular, by using an arbitrary number of moments, we prove that (1) on a macroscopic scale all nonlocal effects, compatible with the uncertainty principle, are imputable to high-order spatial derivatives, both of the numerical density n and of the effective temperature T; (2) the results available from the literature in the framework of both a quantum Boltzmann gas and a degenerate quantum Fermi gas are recovered as a particular case; (3) the statistics for the quantum Fermi and Bose gases at different levels of degeneracy are explicitly incorporated; (4) a set of relevant applications admitting exact analytical equations are explicitly given and discussed; (5) the quantum maximum entropy principle keeps full validity in the classical limit, when ({h_bar}/2{pi}){yields}0.

OSTI ID:
21612539
Journal Information:
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics (Print), Journal Name: Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics (Print) Journal Issue: 6 Vol. 84; ISSN 1539-3755
Country of Publication:
United States
Language:
English

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Related Subjects

71 CLASSICAL AND QUANTUM MECHANICS
GENERAL PHYSICS
BOSE-EINSTEIN GAS
DENSITY MATRIX
ENTROPY
EQUATIONS
EQUILIBRIUM
FERMI GAS
FUNCTIONS
MATHEMATICS
MATRICES
MECHANICS
PHYSICAL PROPERTIES
QUANTUM MECHANICS
STATISTICS
THERMODYNAMIC PROPERTIES
TRANSPORT THEORY
UNCERTAINTY PRINCIPLE