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- Shanks_transformation abstract "In numerical analysis, the Shanks transformation is a non-linear series acceleration method to increase the rate of convergence of a sequence. This method is named after Daniel Shanks, who rediscovered this sequence transformation in 1955. It was first derived and published by R. Schmidt in 1941.".
- Shanks_transformation thumbnail Shanks_transformation.svg?width=300.
- Shanks_transformation wikiPageID "21581860".
- Shanks_transformation wikiPageLength "9372".
- Shanks_transformation wikiPageOutDegree "21".
- Shanks_transformation wikiPageRevisionID "645976438".
- Shanks_transformation wikiPageWikiLink Aitkens_delta-squared_process.
- Shanks_transformation wikiPageWikiLink Category:Asymptotic_analysis.
- Shanks_transformation wikiPageWikiLink Category:Numerical_analysis.
- Shanks_transformation wikiPageWikiLink Daniel_Shanks.
- Shanks_transformation wikiPageWikiLink Determinant.
- Shanks_transformation wikiPageWikiLink Fluid_mechanics.
- Shanks_transformation wikiPageWikiLink Milton_Van_Dyke.
- Shanks_transformation wikiPageWikiLink Nonlinear_system.
- Shanks_transformation wikiPageWikiLink Numerical_analysis.
- Shanks_transformation wikiPageWikiLink Padé_approximant.
- Shanks_transformation wikiPageWikiLink Padé_table.
- Shanks_transformation wikiPageWikiLink Perturbation_theory.
- Shanks_transformation wikiPageWikiLink Rate_of_convergence.
- Shanks_transformation wikiPageWikiLink Richardson_extrapolation.
- Shanks_transformation wikiPageWikiLink Sequence.
- Shanks_transformation wikiPageWikiLink Sequence_transformation.
- Shanks_transformation wikiPageWikiLink Series_acceleration.
- Shanks_transformation wikiPageWikiLink Transient_(oscillation).
- Shanks_transformation wikiPageWikiLink File:Shanks_transformation.svg.
- Shanks_transformation wikiPageWikiLinkText "Shanks transformation".
- Shanks_transformation align "right".
- Shanks_transformation quote "One can calculate only a few terms of a perturbation expansion, usually no more than two or three, and almost never more than seven. The resulting series is often slowly convergent, or even divergent. Yet those few terms contain a remarkable amount of information, which the investigator should do his best to extract.".
- Shanks_transformation quote "This viewpoint has been persuasively set forth in a delightful paper by Shanks , who displays a number of amazing examples, including several from fluid mechanics.".
- Shanks_transformation source "Milton D. Van Dyke Perturbation methods in fluid mechanics, p. 202.".
- Shanks_transformation width "60.0".
- Shanks_transformation wikiPageUsesTemplate Template:Citation.
- Shanks_transformation wikiPageUsesTemplate Template:Cite_arxiv.
- Shanks_transformation wikiPageUsesTemplate Template:Quote_box.
- Shanks_transformation wikiPageUsesTemplate Template:Reflist.
- Shanks_transformation subject Category:Asymptotic_analysis.
- Shanks_transformation subject Category:Numerical_analysis.
- Shanks_transformation hypernym Method.
- Shanks_transformation type Software.
- Shanks_transformation type Algorithm.
- Shanks_transformation comment "In numerical analysis, the Shanks transformation is a non-linear series acceleration method to increase the rate of convergence of a sequence. This method is named after Daniel Shanks, who rediscovered this sequence transformation in 1955. It was first derived and published by R. Schmidt in 1941.".
- Shanks_transformation label "Shanks transformation".
- Shanks_transformation sameAs Q3537519.
- Shanks_transformation sameAs Transformation_de_Shanks.
- Shanks_transformation sameAs m.05mwzmh.
- Shanks_transformation sameAs Q3537519.
- Shanks_transformation wasDerivedFrom Shanks_transformation?oldid=645976438.
- Shanks_transformation depiction Shanks_transformation.svg.
- Shanks_transformation isPrimaryTopicOf Shanks_transformation.