Statistical Mechanics of Nonequilibrium Processes, Volume 1 (See 3527400834): Basic Concepts, Kinetic TheoryWiley, 13 jun 1996 - 375 páginas A unified approach to the modern statistical theory of nonequilibrium processes. This book explores applications of this unified approach to classical and quantum kinetic theory of nonideal gases, to plasmas, and to solid state physics. |
Índice
Classical distribution functions | 11 |
Quantum Liouville equation | 40 |
Equilibrium statistical ensembles | 57 |
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Términos y frases comunes
approximation assume average values binary correlation function Boltzmann equation boundary condition calculated classical cluster expansions collision integral considered correlation function corresponding defined depend derived described diagonal diagrams discussed dynamical variables electrons energy equilibrium evolution operator expressed in terms f₁ formula gases given by Eq Hamiltonian hydrodynamic information entropy interaction introduce kinetic equation kinetic theory Lagrange multipliers Liouville equation Liouville operator macroscopic many-particle Markovian matrix elements momentum N-particle nonequilibrium distribution nonequilibrium statistical operator number of particles obtain Orel P₁ P₁P2 P₂ parameter phase variables plasma potential Prel(t quantities r₁ relation relevant distribution relevant statistical operator relevant variables representation right-hand side self-consistency conditions side of Eq single-particle density matrix single-particle distribution function solution source term statistical ensembles statistical mechanics Subsection t₁ theorem thermodynamic thermodynamic entropy three-particle tion two-particle wave function Wigner function written