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On a Class of Generalized Sampling Functions

On a Class of Generalized Sampling Functions
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摘要 In this note, we discuss a class of so-called generalized sampling functions. These functions are defined to be the inverse Fourier transform of a family of piecewise constant functions that are either square integrable or Lebegue integrable on the real number line. They are in fact the generalization of the classic sinc function. Two approaches of constructing the generalized sampling functions are reviewed. Their properties such as cardinality, orthogonality, and decaying properties are discussed. The interactions of those functions and Hilbert transformer are also discussed. In this note, we discuss a class of so-called generalized sampling functions. These functions are defined to be the inverse Fourier transform of a family of piecewise constant functions that are either square integrable or Lebegue integrable on the real number line. They are in fact the generalization of the classic sinc function. Two approaches of constructing the generalized sampling functions are reviewed. Their properties such as cardinality, orthogonality, and decaying properties are discussed. The interactions of those functions and Hilbert transformer are also discussed.
作者 Yi Wang
机构地区 Department of Mathematics
出处 《Analysis in Theory and Applications》 2014年第1期82-89,共8页 分析理论与应用(英文刊)
关键词 Generalized sampling function sinc function non-bandlimited signal sampling the-orem Hilbert transform. Generalized sampling function, sinc function, non-bandlimited signal, sampling the-orem, Hilbert transform.
分类号 O174 [理学—基础数学]
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参考文献10

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Analysis in Theory and Applications
2014年 第1期

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