• DocumentCode
    2063099
  • Title

    Interacting dipole charges in non-linear dielectrics: a Monte Carlo simulation

  • Author

    Kliem, H. ; Farag, N.

  • Author_Institution
    Inst. of Electr. Eng. Phys., Saarbrucken Univ., Germany
  • Volume
    1
  • fYear
    1997
  • fDate
    19-22, Oct 1997
  • Firstpage
    11
  • Abstract
    Numerical calculations of the electrostatic dipole-dipole interaction and the resulting effects on the dielectric polarization are performed. Dipoles of finite length, which are randomly distributed in space, decrease the polarization of the whole dipole system due to their interaction. Dipoles on cubic lattice sites increase the polarization due to the interaction, as predicted by the Lorentz model. When the dipoles are shifted from their regular sites, the polarization decreases with the degree of disorder. If the length of lattice dipoles is increased, the interaction decreases the polarization too. Both lattice and disordered dipole systems exhibit hysteresis loops of their polarization. The remanent polarization of lattice dipoles drops sharply and for disordered dipoles it drops smoothly with temperature. The interaction results in distribution of activation energies for the dipoles
  • Keywords
    Monte Carlo methods; dielectric hysteresis; dielectric polarisation; dielectric relaxation; electric moments; Lorentz model; Monte Carlo simulation; activation energies; cubic lattice sites; dielectric polarization; disordered dipoles; electrostatic dipole-dipole interaction; hysteresis loops; interacting dipole charges; nonlinear dielectrics; remanent polarization; Dielectrics; Electric potential; Electrodes; Electrostatics; Hysteresis; Lattices; Physics; Polarization; Potential well; Temperature;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Electrical Insulation and Dielectric Phenomena, 1997. IEEE 1997 Annual Report., Conference on
  • Conference_Location
    Minneapolis, MN
  • Print_ISBN
    0-7803-3851-0
  • Type

    conf

  • DOI
    10.1109/CEIDP.1997.634547
  • Filename
    634547