• DocumentCode
    2878903
  • Title

    An implicit maxwell solver

  • Author

    Christlieb, A. ; VanGroingen, Lee ; Ben Ong

  • Author_Institution
    Math., Michigan State Univ., East Lansing, MI, USA
  • fYear
    2011
  • fDate
    26-30 June 2011
  • Firstpage
    1
  • Lastpage
    1
  • Abstract
    Summary form only given. In this work, we present progress towards the develop of a Lagrangian method which can be implemented as a semi-implicit or a fully implicit scheme for the Vlasov Maxwell system aimed at bridging the time scale gap between electron plasma oscillations and the speed of light. At the heart of the proposed method is the development of an implicit Maxwell solver that recovers the Darwin limit of electromagnetics as c →∞. The proposed implicit Maxwell solver differs from others in that the method will first discretize the time operator and then invert the resulting semi-discreet wave operator using a free space Greens function. We refer to the approach of first discretizing in time as the Method of Lines Transpose (MOLT), but this work departs from other MOLT methods in that we work directly with high order time derivatives. A major advantage of the new method over purely using the Darwin limit is that the new method can incorporate dielectric layers, which is not possible if the strict Darwin limit is used. In the presentation, we entirely focus on the novel implicit wave solver and its theoretical and practical properties in 1D and 3D. The new method leverages previous work on fast summation methods for gridless plasmas simulation tools and novel parallel time integration methods developed by the team.
  • Keywords
    Green´s function methods; Maxwell equations; Vlasov equation; plasma oscillations; plasma simulation; Darwin limit; Lagrangian method; Vlasov Maxwell system; dielectric layers; electromagnetics; electron plasma oscillations; fast summation methods; free space Greens function; gridless plasmas simulation tools; implicit Maxwell solver; implicit wave solver; light speed; lines transpose method; parallel time integration methods; semidiscreet wave operator; time operator; time scale gap;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Plasma Science (ICOPS), 2011 Abstracts IEEE International Conference on
  • Conference_Location
    Chicago, IL
  • ISSN
    0730-9244
  • Print_ISBN
    978-1-61284-330-8
  • Electronic_ISBN
    0730-9244
  • Type

    conf

  • DOI
    10.1109/PLASMA.2011.5992902
  • Filename
    5992902