非首一矩阵多项式的解(英文)

On solvents of nonmonic matrix polynomials

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摘要发展了一种关于非首一矩阵多项式解的计算理论.综述了基于特征对概念的相伴lambda矩阵的谱理论.研究了伴随型的线性化,引进了广义Vandermonde矩阵.给出了解存在的条件,并获得解的个数的估计.数值例子阐明了所提出的理论. A computation theory for solvents of nonmonic matrix polynomials is developed.A survey of the spectral theory of the associated lambda matrix in terms of the concept of eigenpair is done.The Unearization in a companion form is studied,and a generalization of the Vandermonde matrix is introduced.Conditions for the existence of solvents are given,and the estimation of their number is obtained.A numerical example illustrates the presented theory.

作者 Edgar Pereira

机构地区北里奥格兰德联邦大学数学系

出处《应用数学与计算数学学报》 2014年第4期390-401,共12页 Communication on Applied Mathematics and Computation

关键词非首一矩阵多项式正则lambda矩阵解 nonmonic matrix polynomial regular lambda-matrix solvent

分类号 O151.21 [理学—基础数学]

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1Gantmacher F. The Theory of Matrices. I. [Mj. New York: Chelsea, 1960.
2Gohberg I, Lancaster P, Rodman L. Spectral analysis of matrix polynomials. I. Canonicalforms and divisors [J]. Linear Algebra Appl, 1978, 20: 1-44.
3Gohberg I,Lancaster P, Rodman L. Spectral analysis of matrix polynomials. II. The resolventform and spectral divisors [J]. Linear Algebra Appl, 1978, 21: 65-88.
4Gohberg I, Rodman L. On spectral analysis of non-monic matrix and operator polynomials.I.Reduction to monic polynomials [J]. Israel J Math, 1978, 30: 133-151.
5Gohberg I, Rodman L. On spectral analysis of non-monic matrix and operator polynomials.II.Dependence on the finite spectral data [J]. Israel J Math, 1978, 30: 321-334.
6Gohberg I,Kaashoek M,Lerer L, Rodman L. Common multiples and common divisors ofmatrix polynomials. I. Spectral method [J]. Indiana University Math Joumal, 1981, 30(3):321-356.
7Cohen N. Spectral analysis of regular matrix polynomials [Jl. Integral Equations and OperatorTheory, 1983, 6: 161-183.
8Pereira E. On solvents of matrix polynomials [J]. Applied Numerical Mathematics, 2003, 42:197-208.
9Lancaster P, Tismenetsky M. The Theory of Matrices [M]. 2nd ed. New York: Academic Press,1985.
10Gohberg I,Lancaster P, Rodman L. Matrix Polynomials [M]. New York: Academic Press,1982.

1邱建霞.增次广义Vandermonde矩阵[J].大学数学,2005,21(3):85-90. 被引量：2
2刘思洪.一类广义Vandermonde矩阵的相关性质[J].丽水学院学报,2011,33(5):1-5.
3赵良东,徐仲,陆全.广义Vandermonde方程组的有效快速算法[J].工程数学学报,2010,27(1):99-104. 被引量：1
4杨胜良.广义Vandermonde矩阵及其LU分解[J].兰州理工大学学报,2004,30(1):116-119. 被引量：1
5赵振华,苏翃,邱利琼.一类广义Vandermonde矩阵的可逆条件及求逆公式[J].大学数学,2010,26(3):196-201. 被引量：1
6马锦锦.二元切触有理插值[J].阜阳师范学院学报（自然科学版）,2006,23(1):34-37. 被引量：1
7梁俊平.广义Vandermonde矩阵的显式LU分解(英文)[J].工程数学学报,2007,24(2):348-352. 被引量：1
8刘思洪.一类广义Vandermonde矩阵的求逆问题[J].湖州师范学院学报,2011,33(2):5-11. 被引量：1
9胡永建.可非负扩张块Hankel矩阵的因子分解[J].北京师范大学学报（自然科学版）,2001,37(2):157-161.

应用数学与计算数学学报

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非首一矩阵多项式的解(英文)

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