DocumentCode
396105
Title
Sharper bounds for the zeros of polynomials
Author
Hasan, Mohammed A.
Author_Institution
Dept. of Electr. & Comput. Eng., Minnesota Univ., Duluth, MN, USA
Volume
3
fYear
2003
fDate
25-28 May 2003
Abstract
In this paper, new upper bounds for the magnitudes of the zeros of polynomials are developed. These bounds are derived from the Cauchy classical bound applied to a new polynomial having zeros with magnitudes that are powers of those of the original polynomial. Lower and upper bounds for the minimum and maximum zeros of real polynomials with real zeros are also developed. Additionally, we derive Kantorovich like inequalities which are used to derive bounds for the condition number and for the eigen spread of real symmetric matrices. The proposed bounds are tested and compared with many existing bounds using several examples.
Keywords
Hermitian matrices; eigenvalues and eigenfunctions; poles and zeros; polynomials; Cauchy classical bound; Kantorovich like inequalities; condition number; eigen spread; polynomials; real symmetric matrices; upper bounds; zeros; Books; Eigenvalues and eigenfunctions; History; Polynomials; Power engineering and energy; Power engineering computing; Stability analysis; Symmetric matrices; Testing; Upper bound;
fLanguage
English
Publisher
ieee
Conference_Titel
Circuits and Systems, 2003. ISCAS '03. Proceedings of the 2003 International Symposium on
Print_ISBN
0-7803-7761-3
Type
conf
DOI
10.1109/ISCAS.2003.1204944
Filename
1204944
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