About one decision of the quasiclassical kinetic equation

  • Authors

    • Gladkov S O
    • Bogdanova S B
    2018-04-20
    https://doi.org/10.14419/ijet.v7i2.23.11929
  • Quasi-Classical Kinetic Equation, Quasi-Equilibrium Distribution Function, Heat – Conductivity, Current Density.

  • 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 .

     

     

  • References

    1. [1] Kaganov M I, Tcukernic V M. To the theory of non resonance absorption of oscillating magnetic field by ferro – dielectrics at low temperatures. News of Academy of the Sciences of the USSR. Series of physical. 25 (1961) p.1346.

      [2] Zyranov P S, Talutz G G. To the theory of sound absorption in the solid states. Journal of experimental and theoretical physics. 49 (1965) p.1942.

      [3] Leggett A J, Ter Haar D. Finite linewidths and “forbidden†three – phonons interactions. Phys. Rev. 139 (1965) A779.

      [4] Gurevich L E, Shklovskii B I. The absorption of longitudinal sound high frequency in the solid body at low temperature. Physics of the solid state. 9 (1967) p.526.

      [5] Gladkov S O. The kinetics of the nuclear magnetic ordering systems. Physics Reports. 182 (1989) p.211.

      [6] Gladkov S O. Dielectric Properties of Porous Media. Springer Verlag, (2003), pp.1-261.

      [7] Lifshitc I M, Azbel M Ya, Kaganov M I. An electronic theory of metals. Moscow. Science, (1971), pp.1-416.

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  • How to Cite

    S O, G., & S B, B. (2018). About one decision of the quasiclassical kinetic equation. International Journal of Engineering & Technology, 7(2.23), 270-273. https://doi.org/10.14419/ijet.v7i2.23.11929