Dynamical Sampling Associated with the Fractional Fourier Transform

被引:0
|
作者
Zhang, Qingyue [1 ]
机构
[1] Tianjin Univ Technol, Coll Sci, Tianjin, Peoples R China
来源
PROCEEDINGS OF 2018 14TH IEEE INTERNATIONAL CONFERENCE ON SIGNAL PROCESSING (ICSP) | 2018年
基金
中国国家自然科学基金;
关键词
fractional Fourier transform; dynamical sampling; Poisson summation formula; convolution and product theorem; shift-invariant spaces; SHIFT-INVARIANT; RECONSTRUCTION; SIGNALS; SPACES;
D O I
暂无
中图分类号
TM [电工技术]; TN [电子技术、通信技术];
学科分类号
0808 ; 0809 ;
摘要
In this paper, we mainly study the dynamical sampling of sequence spaces and shift-invariant spaces in the fractional Fourier transform domains. We show that how to recover the signals in sequence spaces or shift-invariant spaces from their dynamical sampling values. We provide a necessary and sufficient condition for the dynamical sampling problem of sequence spaces and shift-invariant spaces in the fractional Fourier transform domains to be solvable. Our results generalize similar ones in the Fourier transform domains.
引用
收藏
页码:1109 / 1113
页数:5
相关论文
共 50 条
  • [21] Sampling Analysis in Weighted Fractional Fourier Transform Domain
    Ran, Qi-Wen
    Zhao, Hui
    Ge, Gui-Xia
    Ma, Jing
    Tan, Li-Ying
    INTERNATIONAL JOINT CONFERENCE ON COMPUTATIONAL SCIENCES AND OPTIMIZATION, VOL 1, PROCEEDINGS, 2009, : 878 - 881
  • [22] Sampling of Bandlimited Signals in Fractional Fourier Transform Domain
    Ran, Qi-Wen
    Zhao, Hui
    Tan, Li-Ying
    Ma, Jing
    CIRCUITS SYSTEMS AND SIGNAL PROCESSING, 2010, 29 (03) : 459 - 467
  • [23] Sampling of Bandlimited Signals in Fractional Fourier Transform Domain
    Qi-Wen Ran
    Hui Zhao
    Li-Ying Tan
    Jing Ma
    Circuits, Systems and Signal Processing, 2010, 29 : 459 - 467
  • [24] A generalized sampling model in shift-invariant spaces associated with fractional Fourier transform
    Zhao, Haoran
    Qiao, Liyan
    Fu, Ning
    Huang, Guoxing
    SIGNAL PROCESSING, 2018, 145 : 1 - 11
  • [25] ON UNIFORM SAMPLING IN SHIFT-INVARIANT SPACES ASSOCIATED WITH THE FRACTIONAL FOURIER TRANSFORM DOMAIN
    Kang, Sinuk
    HONAM MATHEMATICAL JOURNAL, 2016, 38 (03): : 613 - 623
  • [26] Fractional Fourier transform associated with polar coordinates
    Sun, Yan-Nan
    Gao, Wen-Biao
    INTERNATIONAL JOURNAL OF WAVELETS MULTIRESOLUTION AND INFORMATION PROCESSING, 2024, 22 (02)
  • [27] The generalized continuous wavelet transform associated with the fractional Fourier transform
    Prasad, Akhilesh
    Manna, Santanu
    Mahato, Ashutosh
    Singh, V. K.
    JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2014, 259 : 660 - 671
  • [28] On single channel sampling in shift-invariant spaces associated with the fractional Fourier transform domain
    Kang, Sinuk
    2016 ASIA-PACIFIC SIGNAL AND INFORMATION PROCESSING ASSOCIATION ANNUAL SUMMIT AND CONFERENCE (APSIPA), 2016,
  • [29] Sampling and sampling rate conversion of band limited signals in the fractional Fourier transform domain
    Tao, Ran
    Deng, Bing
    Zhang, Wei-Qiang
    Wang, Yue
    IEEE TRANSACTIONS ON SIGNAL PROCESSING, 2008, 56 (01) : 158 - 171
  • [30] On the Linear Fractional Shift Invariant Systems Associated With Fractional Fourier Transform
    Shi, Jun
    Sha, Xuejun
    Song, Xiaocheng
    Zhang, Naitong
    2011 6TH INTERNATIONAL ICST CONFERENCE ON COMMUNICATIONS AND NETWORKING IN CHINA (CHINACOM), 2011, : 511 - 515
12345