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dc.contributor.authorBehforooz, GH-
dc.contributor.authorPapamichael, N-
dc.identifier.citationMaths Technical Papers (Brunel University). Mar 1980, pp 1-17en
dc.description.abstractLet Q be a quintic spline with equi-spaced knots on [a,b] interpolating a given function y at the knots. The parameters which determine Q are used to construct a piecewise defined polynomial P of degree six. It is shown that P can be used to give at any point of [a,b] better orders of approximation to y and its derivatives than those obtained from Q. It is also shown that the superconvergence properties of the derivatives of Q, at specific points of [a,b], are all simple consequences of the properties of P.en
dc.format.extent262235 bytes-
dc.publisherBrunel Universityen
dc.relation.ispartofBrunel University Mathematics Technical Papers collection;-
dc.titleSuperconvergence properties of quintic interpolatroy splinesen
dc.typeResearch Paperen
Appears in Collections:Dept of Mathematics Research Papers
Mathematical Sciences

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