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Block-Diagonalization of Quaternion Circulant Matrices with Applications
Junjun Pan
*
,
Michael K. Ng
*
Corresponding author for this work
Department of Mathematics
Research output
:
Contribution to journal
›
Journal article
›
peer-review
12
Citations (Scopus)
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Dive into the research topics of 'Block-Diagonalization of Quaternion Circulant Matrices with Applications'. Together they form a unique fingerprint.
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Keyphrases
Quaternion
100%
Circulant Matrix
100%
Block Diagonalization
100%
Fourier Matrix
28%
Quaternion Tensor
28%
Imaginary Unit
28%
2-blocks
14%
Block Matrix
14%
Quaternion number
14%
Toeplitz System
14%
T-SVD
14%
Discrete Fourier
14%
Linear Prediction
14%
Transform Matrix
14%
By-1
14%
Quaternion Signals
14%
Discrete Quaternion Fourier Transform
14%
Mathematics
Circulant Matrix
100%
Tensor
28%
Fourier Matrix
28%
Imaginary Unit
28%
Matrix (Mathematics)
14%
Singular Value Decomposition
14%
Block Matrix
14%
Fourier Transform
14%
Linear Prediction
14%
Engineering
Circulant
100%
Imaginary Unit
28%
Diagonalized Form
28%
Fourier Transform
14%
Singular Value Decomposition
14%
Block Matrix
14%
Linear Prediction
14%