On Real Development of Quantum Statistical Mechanics
Poster-Virtual · Withdrawn
Abstract
In this poster, I will present real development of quantum statistical mechanics. To begin with, I will present first fundamental equation for quantum statistical mechanical reduced density operator of all thermodynamic system. I will then present first energy eigenequation at finite temperature and first accompanying quantum statistical distribution for study of an actual quantum structure of a thermodynamic system. I will further present a first quantum mechanical theory for study of thermodynamics of this thermodynamic system that is based on an actual quantum structure of this thermodynamic system stated. All these equations and theory as presented have truly developed and correspondingly established quantum statistical mechanics and have made quantum statistical mechanics a major quantum science for everything!
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Publication: [1] "Reduced Bloch Equations and Approximate and Exact Solutions", L. Q. Wei, Jilin University Thesis (Jilin University, June 1989). [ LOC Registration #: TX 8-294-976 ]
[2] "Hierarchy Bloch Equations for the Reduced Statistical Density Operator in Canonical and Grand Canonical Ensembles", L. Q. Wei, Physica A 334, 144 (2004). [ Corrigendum: 391, 1907 (2012) ]
[3] "Orbital Approximation for the Reduced Bloch Equation: Fermi-Dirac Distribution for Interacting Fermions and Hartree-Fock Equation at Finite Temperature", L. Q. Wei, Physica A 334, 151 (2004). [ Corrigendum: 391, 1907 (2012) ]
Presenters
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Liqiang Wei
- Institute for Physics