• DocumentCode
    1957078
  • Title

    Solution of Searched Function Normal Derivative Jump Problem with Internal or External Neumann Condition for the Laplacian in R3 by Means of Simple and Double Layer Potentials

  • Author

    Polishchuk, Alexander D.

  • Author_Institution
    Inst. of Appl. Problems of Mech. & Math., Lviv
  • fYear
    2007
  • fDate
    17-20 Sept. 2007
  • Firstpage
    98
  • Lastpage
    101
  • Abstract
    Modeling of electrostatic fields at the environments with different characters leads to necessity of solution of the jump boundary value problems for the Laplacian in R3. The normal derivative jump problem at the Hilbert space the normal derivative elements of which have the jump through boundary surface was considered in (Nedelec, 1973). Solution of this problem was searched as simple layer potential. At the Hilbert space elements of which as their normal derivatives have the jump through boundary surface only normal derivative jump condition is not sufficient for obtaining of searched function. We have to add to this condition additional internal or external Neumann condition and suggest to look for the solution of this problem the sum of simple and double layer potentials (Polishchuk, 2003).
  • Keywords
    Hilbert spaces; Laplace equations; boundary-value problems; computational electromagnetics; electric fields; Hilbert space elements; double layer potentials; electrostatic fields; external Neumann condition; internal Neumann condition; jump boundary value problems; normal derivative jump problem; Boundary value problems; Electronic mail; Electrostatics; Gold; Hafnium; Hilbert space; Laplace equations; Mathematical model; Mathematics;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Direct and Inverse Problems of Electromagnetic and Acoustic Wave Theory, 2007 XIIth International Seminar/Workshop on
  • Conference_Location
    Lviv
  • Print_ISBN
    978-966-02-4237-1
  • Type

    conf

  • DOI
    10.1109/DIPED.2007.4373584
  • Filename
    4373584