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dc.contributor.authorGunarathna, WA
dc.contributor.authorNasir, HM
dc.date.accessioned2018-05-23T12:40:13Z
dc.date.available2018-05-23T12:40:13Z
dc.date.issued2015
dc.identifier.urihttp://ir.kdu.ac.lk/handle/345/1328
dc.descriptionArticle Full Texten_US
dc.description.abstractLet l i n l lin x axp    1 0)( be a univariate polynon mial of degree 1 n defined on ] [x ,where ][ x denotes the ring of polynomials in x over  , the field of real numbers and let } ,,{ 1 0  nxxS  be any set of mdistinct elements in .  The role of Multipoint Evaluation Problem (MEP) is to compute the finite sum l i n l lin x axp    1 0)( for all . ,,, mi 10 These types of evaluations are used most abundantly in many areas such as Engineering, Physics, Medicine, and Weather forecasting. The MEP of interest in this paper is restricted to the case where n m .The paper proposes a new algorithm with asymptotic time complexity of ) ( 2 nO for the MEP. For the sake of simplicity, we assume that ,kn 2 where  ,,, 210k .We explore performance of the algorithm by means of numerical experiments. The numerical results confirm that the algorithm is faster than Estrin’s method and that it is as accurate as Estrin’s method.en_US
dc.language.isoenen_US
dc.subjectMultipoint evaluation problemen_US
dc.subjectHorner’s ruleen_US
dc.subjectEstrin’s methoden_US
dc.titleA New Algorithm for Multipoint Evaluation of Univariate Polynomialsen_US
dc.typeArticle Full Texten_US
dc.identifier.journalKDU IRCen_US
dc.identifier.pgnos90-96en_US


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