The application of Cayley-Bacharach Theorem to bivariate Lagrange interpolation

Xue-Zhang Liang; Li-Hong Cui; Jie-Lin Zhang

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The application of Cayley-Bacharach Theorem to bivariate Lagrange interpolation

机译：Cayley-Bacharach定理在二元Lagrange插值中的应用

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摘要

In this paper, we give a new proof of the famous Cayley-Bacharach theorem by means of interpolation, and deduce a general method of constructing properly posed set of nodes for bivariate Lagrange interpolation. As a result, we generalize the main results in Liang (On the interpolations and approximations in several variables, Jilin University, 1965), Liang and Lu (Approximation Theory IX, Vanderbilt University Press, 1988) and Liang et al. (Analysis, Combinatorics and Computing, Nova Science Publishers, Inc., New York, 2002) to the more extensive situations.

机译：在本文中，我们通过插值给出了著名的Cayley-Bacharach定理的新证明，并推导了为二元Lagrange插值构造适当摆放的节点集的一般方法。结果，我们将主要结果归纳为Liang（关于几个变量的插值和逼近，吉林大学，1965），Liang和Lu（逼近理论，范德比尔特大学出版社，1988）和Liang等人。（分析，组合与计算，Nova Science Publishers，Inc。，纽约，2002年）适用于更广泛的情况。

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来源
《Journal of Computational and Applied Mathematics》 |2004年第1期|共11页
作者
Xue-Zhang Liang; Li-Hong Cui; Jie-Lin Zhang;
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正文语种 eng
中图分类应用数学;
关键词
bivariate Lagrange interpolation; properly posed set of nodes for bivariate Lagrange interpolation; Lagrange interpolation along a plane algebraic curve;

机译：二元Lagrange插值;二元Lagrange插值的适定节点集;沿平面代数曲线的Lagrange插值;

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The application of Cayley-Bacharach Theorem to bivariate Lagrange interpolation

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