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ICIP
2004
IEEE
2004
IEEE
Quaternion wavelets for image analysis and processing
Using the concepts of two-dimensional Hilbert transform and analytic signal, we construct a new quaternion wavelet transform (QWT). The QWT forms a tight frame and can be efficiently computed using a 2-D dual-tree filter bank. The QWT and the 2-D complex wavelet transform (CWT) are related by a unitary transformation, but the former inherits the quaternion Fourier transform (QFT) phase properties, which are desirable for image analysis. The quaternion magnitude-phase representation of the QWT directly leads to near shift-invariance and the ability to encode phase shifts in an absolute xy-coordinate system, which we can use for applications such as edge estimation and statistical image modeling.
Real-time TrafficComplex Wavelet Transform | ICIP 2004 | Image Processing | Quaternion Fourier Transform | Quaternion Magnitude-phase Representation | Quaternion Wavelet Transform | Two-dimensional Hilbert Transform |
| Added | 24 Oct 2009 |
| Updated | 27 Oct 2009 |
| Type | Conference |
| Year | 2004 |
| Where | ICIP |
| Authors | Wai Lam Chan, Hyeokho Choi, Richard G. Baraniuk |
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