• DocumentCode
    3411017
  • Title

    Construction and application of orthogonal polynomials in kinetics of quasi-particles

  • Author

    Aleksin, V.F. ; Belyaev, N.R. ; Belyaeva, T.N. ; Khodusov, V.D.

  • Author_Institution
    Dept. of Phys. & Technol., Kharkov State Univ., Ukraine
  • fYear
    1996
  • fDate
    10-13 Sep 1996
  • Firstpage
    61
  • Lastpage
    64
  • Abstract
    To determine macroscopic hydrodynamic quantities and kinetic coefficients in different media on the basis of the kinetic theory of particles (quasiparticles), one must know the solution of the kinetic equation for the distribution function. In the kinetic theory of monatomic gases, a set of polynomials is presented by the classical Sonin-Laguerre polynomials. Here, we apply a similar method of calculating kinetic coefficients in a gas of quasiparticles, the energy of which may depend on different external parameters (electrical or magnetic fields, for instance). In this case, the use of classical polynomials appears not to be efficient. Therefore, it is advantageous to construct a special set of orthogonal polynomials on the basis of the weight function characteristic of Bose-Einstein or Fermi-Dirac statistics, a proper choice of which allows us to restrict ourselves to a finite number of first polynomials when calculating kinetic coefficients
  • Keywords
    gases; kinetic theory; polynomials; quantum statistical mechanics; quasiparticles; statistics; Bose-Einstein statistics; Fermi-Dirac statistics; classical Sonin-Laguerre polynomials; distribution function; kinetic coefficients; kinetic equation; macroscopic hydrodynamic quantities; orthogonal polynomials; quasi-particle gas; weight function; Gaussian processes; Hafnium; Kinetic theory; Polynomials; Standardization;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Mathematical Methods in Electromagnetic Theory, 1996., 6th International Conference on
  • Conference_Location
    Lviv
  • Print_ISBN
    0-7803-3291-1
  • Type

    conf

  • DOI
    10.1109/MMET.1996.565628
  • Filename
    565628