陶有田,朱晓临,周金明.二元向量值有理插值存在性的一种判别方法[J].数学研究及应用,2008,28(3):682~690
二元向量值有理插值存在性的一种判别方法
A Criterion for Existence of Bivariate Vector Valued Rational Interpolants
投稿时间:2006-06-22  修订日期:2006-12-12
DOI:10.3770/j.issn:1000-341X.2008.03.031
中文关键词:  二元Newton插值公式  二元向量值有理插值  存在性  充要条件.
英文关键词:bivariate Newton interpolation formula  bivariate vector-valued rational interpolants  existence  necessary and sufficient conditions.
基金项目:国家自然科学基金(No.60473114); 安徽省自然科学基金(No.070416227); 安徽省教育厅自然科学研究计划(No.KJ2008B246); 安徽省高校青年教师资助计划(No.2008jq1110);巢湖学院科学研究基金(No.XLY-200705).
作者单位
陶有田 巢湖学院数学系, 安徽 巢湖 238000
合肥工业大学理学院, 安徽 合肥 230009 
朱晓临 合肥工业大学理学院, 安徽 合肥 230009 
周金明 合肥工业大学理学院, 安徽 合肥 230009 
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中文摘要:
      文章给出了对于矩形网格上基于二元Newton插值公式的二元向量值有理插值存在性的充要条件.在存在的情况下,建立了具有显式表达式的不同于向量连分式的二元向量值有理插值函数,并且这种方法具有承袭性.最后给出的实例说明了这种算法的有效性.
英文摘要:
      In this paper, a necessary and sufficient condition for the existence of a kind of bivariate vector valued rational interpolants over rectangular grids is given. This criterion is an algebraic method, i.e., by solving a system of equations based on the given data, we can directly test whether the relevant interpolant exists or not. By coming up with our method, the problem of how to deal with scalar equations and vector equations in the same system of equations is solved. After testing existence, an expression of the corresponding bivariate vector-valued rational interpolant can be constructed consequently. In addition, the way to get the expression is different from the one by making use of Thiele-type bivariate branched vector-valued continued fractions and Samelson inverse which are commonly used to construct the bivariate vector-valued rational interpolants. Compared with the Thiele-type method, the one given in this paper is more direct. Finally, some numerical examples are given to illustrate the result.
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