© 2014

Progress in Differential-Algebraic Equations

Deskriptor 2013

  • Sebastian Schöps
  • Andreas Bartel
  • Michael Günther
  • E. Jan W. ter Maten
  • Peter C Müller
  • Coupled descriptor systems are a hot topic in applied mathematics, with cross-disciplinary interaction with engineering and physics

  • The methods used include recent techniques from multi-scale methods

  • Geared towards industrial applications: automotive, electronic

Conference proceedings

Part of the Differential-Algebraic Equations Forum book series (DAEF)

Table of contents

  1. Front Matter
    Pages i-x
  2. Control

  3. Simulation

    1. Front Matter
      Pages 71-71
    2. Diana Estévez Schwarz, René Lamour
      Pages 73-95
    3. Lennart Jansen, Caren Tischendorf
      Pages 127-151
  4. Model Order Reduction

    1. Front Matter
      Pages 153-153
    2. Nicodemus Banagaaya, Wil H. A. Schilders
      Pages 155-182
    3. Sara Grundel, Lennart Jansen, Nils Hornung, Tanja Clees, Caren Tischendorf, Peter Benner
      Pages 183-205
  5. Back Matter
    Pages 207-208

About these proceedings


This book contains the proceedings of the 8th Workshop on Coupled Descriptor Systems held March 2013 in the Castle of Eringerfeld, Geseke in the neighborhood of Paderborn, Germany. It examines the wide range of current research topics in descriptor systems, including mathematical modeling, index analysis, wellposedness of problems, stiffness and different time-scales, cosimulation and splitting methods and convergence analysis. In addition, the book also presents applications from the automotive and circuit industries that show that descriptor systems provide challenging problems from the point of view of both theory and practice.  

The book contains nine papers and is organized into three parts: control, simulation, and model order reduction. It will serve as an ideal resource for applied mathematicians and engineers, in particular those from mechanics and electromagnetics, who work with coupled differential equations.


coupling differential algebraic equations dynamics model order reduction modelling multiscale observability stability time integration

Editors and affiliations

  • Sebastian Schöps
    • 1
  • Andreas Bartel
    • 2
  • Michael Günther
    • 3
  • E. Jan W. ter Maten
    • 4
  • Peter C Müller
    • 5
  1. 1.Technische Universität Darmstadt, Graduate School CEDarmstadtGermany
  2. 2.Bergische Universität Wuppertal, Applied Math. and Numerical AnalysisWuppertalGermany
  3. 3.Bergische Univeirsität Wuppertal, Applied Math. and Numerical AnalysisWuppertalGermany
  4. 4.Eindhoven University of Technology, Dept. Mathematics & Comp. Sci.EindhovenThe Netherlands
  5. 5.Bergische Universität Wuppertal, Dept. Safety Control EngineeringWuppertalGermany

Bibliographic information