• DocumentCode
    3849466
  • Title

    Fast Computation of Sommerfeld Integral Tails via Direct Integration Based on Double Exponential-Type Quadrature Formulas

  • Author

    Ružica Golubovic Niciforovic;Athanasios G. Polimeridis;Juan R. Mosig

  • Author_Institution
    Laboratory of Electromagnetics and Acoustics (LEMA), Ecole Polytechnique Fé
  • Volume
    59
  • Issue
    2
  • fYear
    2011
  • Firstpage
    694
  • Lastpage
    699
  • Abstract
    A direct integration algorithm, based on double exponential-type quadrature rules, is presented for the efficient computation of the Sommerfeld integral tails, arising in the evaluation of multilayered Green´s functions. The proposed scheme maintains the error controllable nature of the so-called partition-extrapolation methods, often used to tackle this problem, whereas it requires substantially reduced computational time. Moreover, the proposed method is very easy to implement, since the associated weights and abscissas can be precomputed. The overall behavior of the proposed method both in terms of accuracy and efficiency is demonstrated through a series of representative numerical experiments, where compared with one of the most proven methods available in the literature.
  • Keywords
    "Green´s function methods","Silicon","Accuracy","Integral equations","Antennas","Extrapolation","Kernel"
  • Journal_Title
    IEEE Transactions on Antennas and Propagation
  • Publisher
    ieee
  • ISSN
    0018-926X
  • Type

    jour

  • DOI
    10.1109/TAP.2010.2096187
  • Filename
    5654547