On the convergence domains of the \(p\)-cyclic SOR
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Publication:1923624
DOI10.1016/0377-0427(95)00245-6zbMath0859.65025OpenAlexW2049546380WikidataQ127498832 ScholiaQ127498832MaRDI QIDQ1923624
Dimitrios Noutsos, Michael Tzoumas, Apostolos Hadjidimos
Publication date: 7 April 1997
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0377-0427(95)00245-6
\(p\)-cyclic matricesblock Jacobi matricesconsistently orderedSchur-Cohn algorithmblock successive overrelaxation method
Related Items (4)
A numerical comparison for a discrete HIV infection of CD4\(^{+}\) T-cell model derived from nonstandard numerical scheme ⋮ Exact SOR convergence regions for a general class of \(p\)-cyclic matrices ⋮ Application of the Schur-Cohn theorem to the precise convergence domain for a \(p\)-cyclic SOR iteration matrix ⋮ Successive overrelaxation (SOR) and related methods
Cites Work
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- Over- and underrelaxation for linear systems with weakly cyclic Jacobi matrices of index p
- \(p\)-cyclic matrices: A generalization of the Young-Frankel successive overrelaxation scheme
- Convergence of block iterative methods applied to sparse least-squares problems
- On the equivalence of the k-step iterative Euler methods and successive overrelaxation (SOR) methods for k-cyclic matrices
- On the optimum relaxation factor associated with \(p\)-cyclic matrices
- Optimal stretched parameters for the SOR iterative method
- Generalised consistent ordering and the optimum successive overrelaxation factor
- On generalizations of the theory of consistent orderings for successive overrelaxation methods
- On complex successive overrelaxation
- Iterative Methods for Solving Partial Difference Equations of Elliptic Type
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