Iterative processes in the Krylov–sonneveld subspaces

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Abstract

The paper presents a generalized block version of the Induced Dimension Reduction (IDR) methods in comparison with the Multi–Preconditioned Semi-Conjugate Direction (MPSCD) algorithms in Krylov subspaces with deflation and low-rank matrix approximation. General and individual orthogonality and variational properties of these two methodologies are analyzed. It is demonstrated, in particular, that for any sequence of Krylov subspaces with increasing dimensions there exists a sequence of the corresponding shrinking subspaces with decreasing dimensions. The main conclusion is that the IDR procedures, proposed by P. Sonneveld and other authors, are not an alternative to but a further development of the general principles of iterative processes in Krylov subspaces. Bibliography: 29 titles.

Original languageEnglish
Pages (from-to)890-899
Number of pages10
JournalJournal of Mathematical Sciences (United States)
Volume224
Issue number6
DOIs
Publication statusPublished - 1 Jan 2017

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