Open AccessAbout one decision of the quasiclassical kinetic equation
Author(s) -
С. О. Гладков,
С. Б. Богданова
Publication year - 2018
Publication title -
international journal of engineering and technology
Language(s) - English
Resource type - Journals
ISSN - 2227-524X
DOI - 10.14419/ijet.v7i2.23.11929
Subject(s) - perturbation theory (quantum mechanics) , distribution function , relaxation (psychology) , kinetic energy , master equation , statistical physics , perturbation (astronomy) , order (exchange) , physics , mathematics , thermodynamics , quantum mechanics , quantum , psychology , social psychology , finance , economics
It has been proved that the solution of the quasi-classical kinetic equation for Bose and Fermi statistics can be represented in the general form, using the relaxation time approximation. The general solution found for the distribution function helps calculate any non – equilibrium characteristics of metals, magnets, and dielectrics in any order of the perturbation theory according to the relaxation time .