Multigrid Methods III

  • W. Hackbusch
  • U. Trottenberg

Table of contents

  1. Front Matter
    Pages I-IX
  2. Invited Papers

  3. Contributed Papers

    1. Front Matter
      Pages 129-129
    2. Dinshaw S. Balsara, Achi Brandt
      Pages 131-142
    3. Achi Brandt, Joseph Greenwald
      Pages 143-154
    4. Jens Burmeister, Graham Horton
      Pages 155-166
    5. Michael Griebel
      Pages 211-221
    6. Bertil Gustafsson, Per Lötstedt
      Pages 223-234
    7. Edgar Katzer
      Pages 253-263
    8. Fue-Sang Lien, Michael A. Leschziner
      Pages 277-288
    9. Wim Sweldens, Dirk Roose
      Pages 353-364
    10. R. Teigland, G. E. Fladmark
      Pages 365-376
  4. Back Matter
    Pages 389-394

About this book


These proceedings contain a selection of papers presented at the Third European Conference on Multigrid Methods which was held in Bonn on October 1-4, 1990. Following conferences in 1981 and 1985, a platform for the presentation of new Multigrid results was provided for a third time. Multigrid methods no longer have problems being accepted by numerical analysts and users of numerical methods; on the contrary, they have been further developed in such a successful way that they have penetrated a variety of new fields of application. The high number of 154 participants from 18 countries and 76 presented papers show the need to continue the series of the European Multigrid Conferences. The papers of this volume give a survey on the current Multigrid situation; in particular, they correspond to those fields where new developments can be observed. For example, se­ veral papers study the appropriate treatment of time dependent problems. Improvements can also be noticed in the Multigrid approach for semiconductor equations. The field of parallel Multigrid variants, having been started at the second European Multigrid Conference, is now at the centre of interest.


algorithms development differential equation equation field finite element method hyperbolic equation mechanics numerical method partial differential equation polynomial presentation Scheme shading turbulence

Editors and affiliations

  • W. Hackbusch
    • 1
  • U. Trottenberg
    • 2
  1. 1.Institut für Informatik und Praktische MathematikUniversität KielKiel 1Germany
  2. 2.Gesellschaft für Mathematik und Datenverarbeitung mbHSankt Augustin 1Germany

Bibliographic information