1. Algebraic algorithms for eigen-problems of a reduced biquaternion matrix and applications.
- Author
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Guo, Zhenwei, Jiang, Tongsong, Wang, Gang, and Vasil'ev, V.I.
- Subjects
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COLOR image processing , *EIGENVECTORS , *COMPLEX matrices , *EIGENANALYSIS , *MATRICES (Mathematics) , *EIGENVALUES , *ALGORITHMS - Abstract
In recent years, the reduced biquaternion algebras have been widely used in color image processing problems and in the field of electromagnetism. This paper studies eigen-problems of reduced biquaternion matrices by means of a complex representation of a reduced biquaternion matrix and derives new algebraic algorithms to find the eigenvalues and eigenvectors of reduced biquaternion matrices. This paper also concludes that the number of eigenvalues of an n × n reduced biquaternion matrix is infinite. In addition, the proposed algebraic algorithms are shown to be effective in application to a color face recognition problem. • The eigen-problems of reduced biquaternion matrices are further studied based on the complex representation form. • Propose new algebraic algorithms for finding the eigenvalues and the eigenvectors of a reduced biquaternion matrix. • An n × n reduced biquaternion matrix has infinite eigenvalues. • There are multiple eigenvalues corresponding to the same eigenvector of a reduced biquaternion matrix. • The proposed method is more comprehensive and can find more eigenvalues of a reduced biquaternion matrix. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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