Section 22

You have free access to this content

Iterative Refinement Revisited

  1. Volker Drygalla*,
  2. Gerhard Zielke

Article first published online: 27 DEC 2004

DOI: 10.1002/pamm.200410314

Issue

PAMM

PAMM

Volume 4, Issue 1, pages 666–667, December 2004

Additional Information

How to Cite

Drygalla, V. and Zielke, G. (2004), Iterative Refinement Revisited. Proc. Appl. Math. Mech., 4: 666–667. doi: 10.1002/pamm.200410314

Author Information

  1. Martin-Luther-Universität Halle-Wittenberg, Institut für Numerische Mathematik, D-06099 Halle (Saale), Germany

*Phone: +49 345 55 24 665, Fax: +49 345 27 004

Publication History

  1. Issue published online: 27 DEC 2004
  2. Article first published online: 27 DEC 2004

SEARCH

SEARCH BY CITATION

ARTICLE TOOLS

Get PDF (123K)

Literatur

  • [1]
    T. Dekker, A floating-point technique for extending the available precision, Numer. Math. 18, 224242 (1971).
  • [2]
    U. W. Kulisch, Advanced arithmetic for the digital computer (Springer, Wien, 2002).
  • [3]
    X. S. Li et al., Design, implementation and testing of extended and mixed precision BLAS, ACM Trans. Math. Software 28, 152205 (2002).
  • [4]
    D. M. Priest, Algorithms for arbitrary precision floating point arithmetic, In: Proceedings of 10th Symposium on Computer Arithmetic (IEEE Computer Society Press, 1991), pp. 132–143.
  • [5]
    C. Runge, Praxis der Gleichungen. (Göschen, Leipzig, 1900), S. 84.
  • [6]
    J. H. Wilkinson, Rounding Errors in Algebraic Processes. (Prentice-Hall, Englewood Cliffs, NJ, 1963).
  • [7]
    J. H. Wilkinson, C. Reinsch, Handbook for Automatic Computation, Vol. II, Linear Algebra, (Springer, Berlin, Heidelberg, New York, 1971).
  • [8]
    J. M. Wolfe, Reducing truncation errors by programming. Comm. ACM 7, 355356 (1964).
  • [9]
    G. Zielke, V. Drygalla, Genaue Lösung linearer Gleichungssysteme, GAMM-Mitteilungen 26, 6106 (2003).
Get PDF (123K)