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Acceleration methods in numerical analysis

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dc.contributor.author Collins, John Hector
dc.date.accessioned 2011-06-21T01:55:45Z
dc.date.accessioned 2022-10-26T21:04:21Z
dc.date.available 2011-06-21T01:55:45Z
dc.date.available 2022-10-26T21:04:21Z
dc.date.copyright 1981
dc.date.issued 1981
dc.identifier.uri https://ir.wgtn.ac.nz/handle/123456789/24914
dc.description.abstract This paper reviews the most significant work to date on acceleration methods including theoretical work. An extensive computational programme is described in which the most powerful accelerators are compared. The author advances the concept and develops the theory of upper and lower bounds for alternating series. Further, he advances two accelerators for monotonic series. en_NZ
dc.format pdf en_NZ
dc.language en_NZ
dc.language.iso en_NZ
dc.publisher Te Herenga Waka—Victoria University of Wellington en_NZ
dc.subject Convergence en_NZ
dc.subject Numerical analysis en_NZ
dc.subject Acceleration of convergence en_NZ
dc.title Acceleration methods in numerical analysis en_NZ
dc.type Text en_NZ
vuwschema.type.vuw Awarded Research Masters Thesis en_NZ
thesis.degree.discipline Mathematics en_NZ
thesis.degree.grantor Te Herenga Waka—Victoria University of Wellington en_NZ
thesis.degree.level Masters en_NZ

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