The inverse generalized eigenvalue problem for generalized jacobi matrices

Author

Li, Zhibin ; Chang, Ling

Author_Institution

Coll. of Math. & Phys., Dalian Jiaotong Univ., Dalian, China

Volume

1

fYear

2010

fDate

30-31 May 2010

Firstpage

29

Lastpage

31

Abstract

This paper presents the following inverse eigenvalue problem for generalized Jacobi matrices: Give two characteristic pairs and a matrix, get a generalized Jacobi matrix (That is the product of secondary diagonal elements of the Jacobi matrix is positive). Let the two characteristic pairs are the characteristic pairs of the inverse generalized eigenvalue problem. The paper discussed the existence and uniqueness of the question´s solution. And the expression of the solution of the problem is given, and some numerical example is provided.

Keywords

Jacobian matrices; eigenvalues and eigenfunctions; inverse problems; characteristic pairs; generalized Jacobi matrices; inverse generalized eigenvalue problem; secondary diagonal element; Educational institutions; Eigenvalues and eigenfunctions; Electronic mail; Inverse problems; Jacobian matrices; Mathematics; Matrix converters; Physics; Shape; Symmetric matrices; generalized Jacobi matrix; generalized eigenvalue; inverse problem;

fLanguage

English

Publisher

ieee

Conference_Titel

Networking and Digital Society (ICNDS), 2010 2nd International Conference on

Conference_Location

Wenzhou

Print_ISBN

978-1-4244-5162-3

Type

conf

DOI

10.1109/ICNDS.2010.5479134

Filename

5479134