| 一种高阶导数有理插值算法 |
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| 引用本文: | 荆科,朱功勤.一种高阶导数有理插值算法[J].吉林大学学报(理学版),2015,53(3):389-394. |
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| 作者姓名: | 荆科 朱功勤 |
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| 作者单位: | 1. 阜阳师范学院 数学与统计学院, 安徽 阜阳 236037; 2. 合肥工业大学 数学学院, 合肥 230009 |
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| 基金项目: | 国家自然科学基金,安徽省自然科学基金,安徽省高校自然科学研究项目 |
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| 摘 要: | 针对目前高阶导数切触有理插值方法计算复杂度较高的问题,利用多项式插值基函数和多项式插值误差的性质,给出一种不仅满足各点插值阶数不相同且插值阶数最高为2的切触有理插值算法,并将其推广到向量值切触有理插值中.解决了切触有理插值函数的存在性及算法复杂性问题,并通过数值实例证明了算法的有效性.
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| 关 键 词: | 切触有理插值 高阶导数 Hermite插值 基函数 |
| 收稿时间: | 2014-07-17 |
A Rational Interpolation Algorithm of Higher Order Derivative |
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| JING Ke
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ZHU Gongqin.A Rational Interpolation Algorithm of Higher Order Derivative[J].Journal of Jilin University: Sci Ed,2015,53(3):389-394. |
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| Authors: | JING Ke ZHU Gongqin |
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| Institution: | 1. School of Mathematics and Statistics, Fuyang Teachers College, Fuyang 236037, Anhui Province, China;2. School of Mathematics, Hefei University of Technology, Hefei 230009, China |
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| Abstract: | In view of the higher computational complexity of the osculatory rational interpolation method of higher derivative mostly based on theidea of generalized vandermonde matrix, by means of basis function of polynomial interpolation and error nature of polynomial interpolation, we proposed an osculatory rational interpolation algorithm that not only satisfies different interpolation order but also makes the toppest of interpolation order equal 2, and italso meets the vector valued osculatory rational interpolation. It solves the problem of the existence of osculatory rational interpolation function and complexity of algorithm. In the end, we illustrated the effectiveness of the algorithm with a numerical example. |
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| Keywords: | osculatory rational interpolation higher order derivative Hermite interpolation basis function |
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