Study Some Properties of a Circulant Matrix

Article Sidebar

pdf
Published: Feb 4, 2023
DOI: https://doi.org/10.25130/tjps.v21i1.957
Keywords:
A circulant matrix, idempotent, nilpotent, stability

Main Article Content

Akram Salim Mohammed

Abstract

The aim of this paper is to study the properties of idempotent, nilpotent and stability to a circulant matrix  which generated by the first row, finally we showed the relation between this properties with eigenvalues of this matrix.

Article Details

How to Cite
Akram Salim Mohammed. (2023). Study Some Properties of a Circulant Matrix. Tikrit Journal of Pure Science, 21(1), 99–101. https://doi.org/10.25130/tjps.v21i1.957
Issue
Vol. 21 No. 1 (2016)
Section
Articles
Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

Tikrit Journal of Pure Science is licensed under the Creative Commons Attribution 4.0 International License, which allows users to copy, create extracts, abstracts, and new works from the article, alter and revise the article, and make commercial use of the article (including reuse and/or resale of the article by commercial entities), provided the user gives appropriate credit (with a link to the formal publication through the relevant DOI), provides a link to the license, indicates if changes were made, and the licensor is not represented as endorsing the use made of the work. The authors hold the copyright for their published work on the Tikrit J. Pure Sci. website, while Tikrit J. Pure Sci. is responsible for appreciate citation of their work, which is released under CC-BY-4.0, enabling the unrestricted use, distribution, and reproduction of an article in any medium, provided that the original work is properly cited.

References

[1] Abadir K., M., Magnus J., R., (2005) , Matrix

Algebra , Printed in The Unitde State of America .

[2] Borrelli, R.L., Coleman, C.S., (1998),.Differential

Equations, New York., John Wiley and Sons, Inc.

[3] Devaney R., L., (1988), Introduction to Chaotic

Dynamical SystemSecond Edition, New York.

Addison- Wesley Publishing Company, Inc.

[4] Hohn F., E., (1972), Introduction to Linear

Algebra, New York. The Macmillan Company, Inc.

[5] Kapur J. N., Arya S. P., Singal M. K., Patwardhan

M., Sinclair P., (2008), Cubic and Biguadrdtic

Equations, Appears in Collections: Block5: Solutions

of Polynomial Equation.

[6] Lee G.,B., (1995), Computer Aided Mathematica

Proof in Finding the Inverse Matrix of a circulant

matrix , Journal of the Korea Society of Mathematical

Education, Vol. 34 , No. 1 , pp. 7-9 .

[7] Yue X., Hu D., Liang X., (2006), Some Properties

of Some Special Matrices, Formalized Mathematics,

University of Bialystok , Vol. 14 , No. 1 , pp. 7-12 .