Some Useful Results Associated with Right-Sided Quaternion Fourier Transform

2018 International Conference on Wavelet Analysis and Pattern Recognition (ICWAPR) Pub Date : 2018-07-01 DOI:10.1109/ICWAPR.2018.8521394
M. Bahri, R. Ashino
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引用次数: 1

Abstract

The uncertainty principles can be regarded as generalization of the uncertainty principles on complex Hilbert space. By applying the linear operators, it is shown that the right-sided quaternion Fourier transform is a unitary operator. The duality property of the right-sided quaternion Fourier transform which enables us to express the alternative form of the Hausdorff-Young inequality associated with the right-sided quaternion Fourier transform is presented. AMS Subject Classification: 11R52, 42A38, 15A66
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关于右侧四元数傅里叶变换的一些有用结果
不确定性原理可以看作是复希尔伯特空间上不确定性原理的推广。利用线性算子,证明了右侧四元数傅里叶变换是一个酉算子。给出了右侧四元数傅里叶变换的对偶性,使我们能够表示与右侧四元数傅里叶变换相关的Hausdorff-Young不等式的替代形式。学科分类:11R52、42A38、15A66
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2018 International Conference on Wavelet Analysis and Pattern Recognition (ICWAPR)
2018 International Conference on Wavelet Analysis and Pattern Recognition (ICWAPR)
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