techreports

  1. Martin Kružík, Jan Valdman,
    1. Computational modeling of magnetic hysteresis with thermal effects,
    2. technical report 2016-10 of the Nečas Center for Mathematical Modeling, Prague, Czech Republic -> pdf-file
  2. Talal Rahman, Jan Valdman,
    1. Fast MATLAB assembly of FEM matrices in 2D and 3D: nodal elements,
    2. technical report 11-2011 of the Max Planck Institute for Mathematics in the Sciences (MIS), Leipzig -> pdf-file
  3. P. Gruber, J. Kienesberger, U. Langer, J. Schoeberl, J. Valdman,
  4. Fast solvers and a posteriori error estimates in elastoplasticity
  5. technical report 09-12 of Doctoral Program "Computational Mathematics" (W1214), Linz -> pdf-file
  6. Sergey Repin, Jan Valdman,
  7. Functional a posteriori error estimates for incremental elasto-plastic problems with hardening,
  8. technical report 227 from 29.01. 2009 of Fachrichtung 6.1 - Mathematik, University of Saarland -> pdf-file
  9. Jan Valdman,
  10. Effective Minimization of Functional Majorant in A Posteriori Error Analysis
  11. technical report 2008-07 of SFB "Numerical and Symbolic Scientific computing" -> pdf-file
  12. Sergey Repin, Jan Valdman,
  13. Functional a posteriori error estimates for incremental models in elasto-plasticity
  14. technical report 2007-40 of Johannes Radon Institute for computational and applied mathematics (RICAM) -> pdf-file
  15. Peter Gruber, Jan Valdman,
  16. Newton-Like Solver for Elastoplastic Problems with hardening and its Local Super-Linear Convergence
  17. technical report 2007-06 of SFB "Numerical and Symbolic Scientific computing" -> pdf-file
  18. Sergey Repin, Jan Valdman,
  19. Functional A posteriori error estimates for problems with nonlinear boundary conditions
  20. technical report 2006-25 of Johannes Radon Institute for computational and applied mathematics (RICAM) -> pdf-file
  21. Andreas Hofinger, Jan Valdman,
  22. Numerical solution of the two-yield elastoplastic minimization problem
  23. technical report 2006-18 of SFB "Numerical and Symbolic Scientific computing" -> pdf-file
  24. Peter Gruber, Jan Valdman,
  25. Solution of Elastoplastic Problem based on the Moreau-Yosida Theorem
  26. technical report 2006-05 of SFB "Numerical and Symbolic Scientific computing" -> pdf-file
  27. Antonio Orlando, Carsten Carstensen, Jan Valdman,
  28. A convergent adaptive finite element method for the primal problem of elastoplasticity
  29. Preprint No. 2005-12 of the Institute of Mathematics, Humboldt-Universität zu Berlin -> pdf-file
  30. Carsten Carstensen, Martin Brokate, Jan Valdman,
  31. A quasi-static boundary value problem in multi-surface elastoplasticity. II: Numerical solution.
  32. technical report 2004-11 of SFB "Numerical and Symbolic Scientific computing" -> pdf-file
  33. Carsten Carstensen, Martin Brokate, Jan Valdman,
  34. A quasi-static boundary value problem in multi-surface elastoplasticity. I: Analysis.
  35. technical report 2003-16 of SFB "Numerical and Symbolic Scientific computing" -> pdf-file
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