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Two-dimensional quaternion wavelet transform |
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| Authors: | Mawardi Bahri,Ré mi Vaillancourt |
| Affiliation: | a Department of Mathematics, Hasanuddin University, KM 10 Tamalanrea, Makassar, Indonesia b Division of Mathematical Sciences, Osaka Kyoiku University, Osaka 582-8582, Japan c Department of Mathematics and Statistics, University of Ottawa, 585 Kind Edward Ave., Ottawa ON, Canada KIN 6N5 |
| Abstract: | In this paper we introduce the continuous quaternion wavelet transform (CQWT). We express the admissibility condition in terms of the (right-sided) quaternion Fourier transform. We show that its fundamental properties, such as inner product, norm relation, and inversion formula, can be established whenever the quaternion wavelets satisfy a particular admissibility condition. We present several examples of the CQWT. As an application we derive a Heisenberg type uncertainty principle for these extended wavelets. |
| Keywords: | Quaternion Fourier transform Admissible quaternion wavelets |
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