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ICIP
2003
IEEE
2003
IEEE
Quaternion matrix singular value decomposition and its applications for color image processing
In this paper, we first discuss the singular value decomposition (SVD) of a quaternion matrix and propose an algorithm to calculate the SVD of a quaternion matrix using its equivalent complex matrix. The singular values of a quaternion matrix are still real and positive, but the two unitary matrices are quaternion matrices with quaternion entries. Then, applications for color image processing by the SVD of a quaternion matrix are given. Since a quatemion matrix can represent a color image, so we can use the SVD of a quaternion matrix to decompose a color image. Therefore, many useful image processing methods by SVD,such as eigen-images, image compression, image enhancement and denoise, can be extended to color image processing without separating the color image into three channel images.
Real-time TrafficColor Image Processing | Equivalent Complex Matrix | ICIP 2003 | Image Processing | Quaternion Entries | Quaternion Matrices | Quaternion Matrix |
Related Content
| Added | 24 Oct 2009 |
| Updated | 24 Oct 2009 |
| Type | Conference |
| Year | 2003 |
| Where | ICIP |
| Authors | Soo-Chang Pei, Ja-Han Chang, Jian-Jiun Ding |
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