-------- Original-Nachricht -------- Betreff: final call for papers EMG2005 Datum: Wed, 23 Mar 2005 15:02:29 +0100 Von: Kees Oosterlee C.W.Oosterlee@math.tudelft.nl Firma: "OptimaNumerics" An: Computational Science Mailing List computational.science@lists.optimanumerics.com

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FINAL CALL for papers:

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8th EMG CONFERENCE on Multigrid, Multilevel and Multiscale Modeling.

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September 27 - 30, 2005, Scheveningen, The Hague, The Netherlands

DEADLINE for ABSTRACT SUBMISSION: 15 April 2005 DEADLINE for EARLY REGISTRATION : 1 June 2005

Organized by Delft University of Technology in cooperation with European Community on Computational Methods in Applied Sciences (ECCOMAS)

For more details, see http://pcse.tudelft.nl/emg2005/index.php.

Topics: * Multigrid methods, Multilevel and related solvers, * Algebraic Multigrid, * Theory and applications of methods, * New fields of application, * Multiscale solution methods and modeling.

Invited speakers:

Weinan E (Princeton) TBA L. Grasedyck (MPI Leipzig) "Domain Decomposition based Hierarchical Matrices" R Hiptmair (ETH Zuerich) "Multigrid for Maxwell eigenproblems" R. Kornhuber (FU. Berlin) "Fast and robust solvers for contact problems in biomechanics" Ch. Reisinger (Oxford) "Hierarchical Approximation and Multilevel Methods in Option Pricing" A. Reusken (Aachen) "Multilevel techniques for two-phase incompressible flows" J. Schoeberl (U. Linz, Austria) "Schwarz Methods for Maxwell Equations" P. Vassilevski (Lawrence Livermore) "Element based adaptive algebraic multigrid" J. Xu (Penn State, US) TBA I. Yavneh (Technion, Haifa) "Multiscale algorithms for image analysis and processing"

OBJECTIVES:

Devoted to dissemination of recent advances and ideas concerning multigrid, multilevel and multiscale methods. Multigrid methods are generally accepted as being the fastest numerical methods for the solution of different partial differential equations. If the idea is generalized to other structures than grids, one obtains multilevel, multiscale or multi-resolution methods, which can successfully be used also for problems characterized by matrix or particle structures etc. A broad range of problems in the sciences and engineering require multiscale modeling and simulation techniques, because of the range of scales involved and the prohibitively large number of variables implied by a monoscale approach. Multigrid, multilevel and multiscale methods are interrelated in various ways. Therefore, the congress aims to bring researchers in these fields together.