| 二元切触有理插值公式 |
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| 引用本文: | 荆 科,康 宁.二元切触有理插值公式[J].计算机工程与应用,2013,49(12):33-35. |
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| 作者姓名: | 荆 科 康 宁 |
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| 作者单位: | 阜阳师范学院 数学与计算科学学院,安徽 阜阳 236037 |
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| 摘 要: | 降低切触有理插值的次数和解决切触有理插值函数的存在性是有理插值的一个重要问题。利用牛顿插值承袭性的思想和分段组合方法,构造出一种二元切触有理插值算法并推广到向量值有理插值,既解决了有理插值的存在性问题,又降低了切触有理插值函数的次数。相比于其他方法,算法的可行性是无条件的,有理插值函数次数较低,算法具有承袭性、计算量低、便于实际应用的特点。
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| 关 键 词: | 二元切触有理插值 承袭性 插值公式 分段组合 埃米特插值 |
Formula of bivariate osculatory rational interpolation |
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| JING Ke,KANG Ning.Formula of bivariate osculatory rational interpolation[J].Computer Engineering and Applications,2013,49(12):33-35. |
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| Authors: | JING Ke KANG Ning |
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| Affiliation: | School of Mathematics and Computational Science, Fuyang Teachers College, Fuyang, Anhui 236037, China |
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| Abstract: | Reducing the degree of osculatory rational interpolation function and solving the existence of osculatory rational interpolation function is an important problem of rational interpolation. This paper constructs a bivariate osculatory rational interpolation algorithm and extends it to vector-valued rational interpolation, by means of nature of heredity and the method of piecewise combination. Compared to other algorithms, this algorithm is unconditional, the degree of rational function is lower, this algorithm has inherited nature and has less computation, and it is easy to application. |
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| Keywords: | bivariate osculatory rational interpolation heredity interpolation formula piecewise combination Hermite interpolation |
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