二元对角向量值有理插值的算法

首先提出了二元对角向量值有理插值问题,它包括主对角和副对角两种向量值有理插值,并分别给出了主对角线和副对角线上向量值有理插值的两种算法,即直接求系数bi,j的算法和基于Samelson广义逆所定义的特殊初等变换的矩阵算法.然后构造了在预给极点情况下求主对角线和副对角线上向量值有理插值的矩阵算法.最后给出多个数值例子说明上述算法的有效性.     

三角网络上二元向量值分叉连分式插值的算法

本文构造了三角网格上的二元向量值有理插值的一个递推算法，并给出了实例     

矩形网格上二元向量有理插值的对偶性

矩形网格上二元向量有理插值的对偶性朱功勤，檀结庆（合肥工业大学）ＴＨＥＤＵＡＬＩＴＹＯＦＢＩＶＳＲＩＡＴＥＶＥＣＴＯＲＶＡＬＵＥＤＲＡＴＩＯＮＡＬＩＮＴＥＲＰＯＬＡＮＴＳＯＶＥＲＲＥＣＴＡＮＧＵＬＡＲＧＲＩＤＳ￥ＺｈｕＧｏｎｇ－ｑｉｎ；ＴａｎＪｉｅ－...     

BIVARIATE LAGRANGE-TYPE VECTOR VALUED RATIONAL INTERPOLANTS

1. IntroductionWynn [11] proposed a method for rational interpolation of vector-vaued quantities givenon a set of distinct illterpolation points. He used colltinued fractions and generalized inversesfor the reciproca1 of vector-vaued qualltities. McCleod …     

COMPUTATION OF VECTOR VALUED BLENDING RATIONAL INTERPOLANTS

As we know, Newton's interpolation polynomial is based on divided differences which can be calculated recursively by the divided-difference scheme while Thiele 's interpolating continued fractions are geared towards determining a rational function which can also be calculated recursively by so-called inverse differences. In this paper, both Newton's interpolation polynomial and Thiele's interpolating continued fractions are incorporated to yield a kind of bivariate vector valued blending rational interpolants by means of the Samelson inverse. Blending differences are introduced to calculate the blending rational interpolants recursively, algorithm and matrix-valued case are discussed and a numerical example is given to illustrate the efficiency of the algorithm.     

离散点集上的向量有理插值算法与特征性质

1引言 给出R~2中离散点集     

BIVARIATE VECTOR VALUED RATIONAL INTERPOLANTS BY BRANCHED CONTINUED FRACTIONS

By making use of Thiele-type bivariate branched continued fractions and Sumelson inverse,we construct a few kinds of bivariate vector valued rational interpolonts (BVRIs) over rectangular grids and find out certain relations among these BVRIs such as boundary identity and duality.     

MATRIX ALGORITHMS AND ERROR FORMULA FOR BIVARIATE THIELE-TYPE RECTANGULAR MATRIX VALUED RATIONAL INTERPOLATION

A new method for the construction of bivariate matrix valued rational interpolants (BGIRI) on a rectangular grid is presented in [6]. The rational interpolants are of Thiele-type continued fraction form with scalar denominator. The generalized inverse introduced by [3]is gen-eralized to rectangular matrix case in this paper. An exact error formula for interpolation is ob-tained, which is an extension in matrix form of bivariate scalar and vector valued rational interpola-tion discussed by Siemaszko[l2] and by Gu Chuangqing [7] respectively. By defining row and col-umn-transformation in the sense of the partial inverted differences for matrices, two type matrix algorithms are established to construct corresponding two different BGIRI, which hold for the vec-tor case and the scalar case.     

二元向量值有理插值存在性的一种判别方法

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.     

二元Thile型向量有理插值的误差公式

借助于Ｓｏｍｅｌｓｏｎ广义逆，文［１］首次讨论了多元向量有理插值问题．本文得到了二元Ｔｈｉｅｌｅ型向量有理插值的一个精确的误差公式．