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By how much can Residual Minimization Accelerate the Convergence of Orthogonal Residual Methods?

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    0404252 - UIVT-O 20010076 RIV NL eng J - Článek v odborném periodiku
    Gutknecht, M. H. - Rozložník, Miroslav
    By how much can Residual Minimization Accelerate the Convergence of Orthogonal Residual Methods?
    Numerical Algorithms. Roč. 27, - (2001), s. 189-213. ISSN 1017-1398
    Grant CEP: GA ČR GA201/98/P108
    Výzkumný záměr: AV0Z1030915
    Klíčová slova: system of linear algebraic equations * iterative method * Krylov space method * conjugate gradient method * biconjugate gradient method * CG * CGNE * CGNR * CGS * FOM * GMRes * QMR * TFQMR * residual smoothing * MR smoothing * QMR smoothing
    Kód oboru RIV: BA - Obecná matematika
    Impakt faktor: 0.438, rok: 2001

    We estimate how much smaller the residuals or quasi-residuals of the minimizing methods can be compared to those of the corresponding Galerkin or Petrov-Galerkin method. By an interpretation of smoothing processes in coordinate space we deepen the understanding of some of the underlying relationships and introduce a unifying framework for minimal residual and quasi-residual smoothing.
    Trvalý link: http://hdl.handle.net/11104/0124515
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