| 二元矩阵有理插值函数的构造 |
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| 引用本文: | 杜伟伟. 二元矩阵有理插值函数的构造[J]. 大学数学, 2011, 27(3): 110-114 |
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| 作者姓名: | 杜伟伟 |
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| 作者单位: | 安徽教育出版社,安徽,合肥,230601 |
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| 摘 要: | 一般构造矩阵值有理函数的方法是利用连分式给出的,其算法的可行性不易预知,且计算量大.本文对于二元矩阵值有理插值的计算,通过引入多个参数,定义一对二元多项式:代数多项式和矩阵多项式,利用两多项式相等的充分必要条件通过求解线性方程组确定参数,并由此给出了矩阵值有理插值公式.该公式简单,具有广阔的应用前景.
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| 关 键 词: | 二元矩阵值 有理插值 参数 方程组 |
Method of Constructing Bivariate Matrix-valued Rational Interpolation Functions |
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| DU Wei-wei. Method of Constructing Bivariate Matrix-valued Rational Interpolation Functions[J]. College Mathematics, 2011, 27(3): 110-114 |
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| Authors: | DU Wei-wei |
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| Affiliation: | DU Wei-wei(Anhui Education Press,Hefei,Anhui 230601,China) |
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| Abstract: | The well-known algorithms of constructing matrix-valued rational interpolations use continued fractions.Their applicability is not easily forecast and they need a large amount of calculation.In this paper,for calculation of bivariate matrix-valued rational interpolations,multi-parameters are introduced and a group of polynomials with two elements,that is an algebraic polynomial and matrix-valued polynomials,are defined.By using the necessary and sufficient conditions for polynomials identity,linear equation... |
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| Keywords: | bivariate matrix-valued rational interpolation parameter system of equations |
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