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dc.contributor.authorEdwards, John T.*
dc.contributor.authorFord, Neville J.*
dc.date.accessioned2007-08-14T16:01:33Z
dc.date.available2007-08-14T16:01:33Z
dc.date.issued2003-05-23
dc.identifier.citationManchester: Manchester Centre for Computational Mathematics, 2003.en
dc.identifier.issn1360-1725en
dc.identifier.urihttp://hdl.handle.net/10034/13241
dc.description.abstractThis paper discusses the qualitative behaviour of solutions to difference equations, focusing on boundedness and stability of solutions. Examples demonstrate how the use of Lipschintz constants can provide insights into the qualitative behaviour of solutions to some nonlinear problems.
dc.description.sponsorshipManchester Centre for Computational Mathematicsen
dc.format.extent173549 bytesen
dc.format.mimetypeapplication/pdfen
dc.language.isoenen
dc.publisherManchester Centre for Computational Mathematicsen
dc.relation.ispartofseriesNumerical analysis reportsen
dc.relation.ispartofseries384en
dc.subjectdifference equationsen
dc.subjectLipschitz constantsen
dc.subjectboundednessen
dc.subjectstabilityen
dc.titleBoundness and stability of differential equationsen
dc.typeReporten
html.description.abstractThis paper discusses the qualitative behaviour of solutions to difference equations, focusing on boundedness and stability of solutions. Examples demonstrate how the use of Lipschintz constants can provide insights into the qualitative behaviour of solutions to some nonlinear problems.


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