Inverse Eigenvalue Problem for Real Symmetric Seven-Diagonal Matrix

被引：0

作者：

Zhao Xin-xin ^{[1
]}

Li Zhi-bin ^{[1
]}

机构：

[1] Dalian Jiaotong Univ, Coll Math & Phys, Dalian 116028, Peoples R China

来源：

ADVANCING KNOWLEDGE DISCOVERY AND DATA MINING TECHNOLOGIES, PROCEEDINGS | 2009年

关键词：

Real symmetric seven-diagonal matrix; Inverse problems; Jacobi matrix;

D O I：

暂无

中图分类号：

TP18 [人工智能理论];

学科分类号：

081104 ; 0812 ; 0835 ; 1405 ;

摘要：

This paper presents the following inverse eigenvalue problem for real symmetric five-diagonal matrix: Question 1 Given real numbers lambda(1), lambda(2), lambda(3) (lambda(1) > lambda(2) > lambda(3)), nonzero vectors x, y, z is an element of R(n). Find n x n real symmetric seven-diagonal matrix A such that Ax = lambda(1)x, Ay = lambda(2)y, Az = lambda(3)z. Question 2 Given real numbers lambda(1), lambda(2), lambda(3) (lambda(1) > lambda(2) > lambda(3)), nonero vectors x, y, z is an element of R(n) and real numbers d(1), d(2), ..., d(n-3). Find n x n real symmetric seven-diagonal matrix T such that Tx = lambda(1)x, Ty = lambda(2)y, Tz = lambda(3)z, and d(1), d(2), ..., d(n-3) is the third minor diahonal. The expression of the solution of the problem is given, and a numerical example is provided.

引用

页码：72 / 77

页数：6

共 50 条

[21] An inverse eigenvalue problem and a matrix approximation problem for symmetric skew-hamiltonian matrices
Dongxiu Xie
Ningjun Huang
Qin Zhang
Numerical Algorithms, 2007, 46 : 23 - 34
[22] An inverse eigenvalue problem and a matrix approximation problem for symmetric skew-hamiltonian matrices
Xie, Dongxiu
Huang, Ningjun
Zhang, Qin
NUMERICAL ALGORITHMS, 2007, 46 (01) : 23 - 34
[23] Extremal inverse eigenvalue problem for bordered diagonal matrices
Pickmann, Hubert
Egana, Juan
Soto, Ricardo L.
LINEAR ALGEBRA AND ITS APPLICATIONS, 2007, 427 (2-3) : 256 - 271
[24] An Eigenvalue Problem for a Symmetric Toeplitz Matrix
Kuznetsov, Yu. I.
NUMERICAL ANALYSIS AND APPLICATIONS, 2009, 2 (04) : 326 - 329
[25] Inverse eigenvalue problem for symmetric and normal matrices
Radwan, Nizar
Linear Algebra and Its Applications, 1996, 248
[26] An inverse eigenvalue problem for symmetric and normal matrices
Radwan, N
LINEAR ALGEBRA AND ITS APPLICATIONS, 1996, 248 : 101 - 109
[27] On the inverse eigenvalue problem of symmetric nonnegative matrices
A. M. Nazari
A. Mashayekhi
A. Nezami
Mathematical Sciences, 2020, 14 : 11 - 19
[28] On the symmetric doubly stochastic inverse eigenvalue problem
Lei, Ying-Jie
Xu, Wei-Ru
Lu, Yong
Niu, Yan-Ru
Gu, Xian-Ming
LINEAR ALGEBRA AND ITS APPLICATIONS, 2014, 445 : 181 - 205
[29] On the inverse eigenvalue problem of symmetric nonnegative matrices
Nazari, A. M.
Mashayekhi, A.
Nezami, A.
MATHEMATICAL SCIENCES, 2020, 14 (01) : 11 - 19
[30] A note on the symmetric recursive inverse eigenvalue problem
Loewy, R
Mehrmann, V
SIAM JOURNAL ON MATRIX ANALYSIS AND APPLICATIONS, 2003, 25 (01) : 180 - 187

← 1 2 3 4 5 →