On Analytical Solutions of the Quasiclassical Kinetic Equation of the Highest-Order Perturbation Theory in the Approximation of the Relaxation Time
Autor: | S. B. Bogdanova, S. O. Gladkov |
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Rok vydání: | 2018 |
Předmět: |
010302 applied physics
Physics 010308 nuclear & particles physics General Physics and Astronomy Non-equilibrium thermodynamics Dielectric Conductivity 01 natural sciences Thermal conductivity Distribution function Kinetic equations Quantum mechanics 0103 physical sciences Order (group theory) Perturbation theory Computer Science::Databases |
Zdroj: | Russian Physics Journal. 61:833-842 |
ISSN: | 1573-9228 1064-8887 |
Popis: | It is proved that the solution of the quasiclassical kinetic equation for the Bose and Fermi statistics can be represented in general in the approximation of the relaxation time. Thanks to the found general solution for the distribution function f(r, p, t), any nonequilibrium characteristic of metals, magnets, and dielectrics can be calculated in any order of perturbation theory in the approximation of the relaxation time τ. |
Databáze: | OpenAIRE |
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