Multiresolution analysis for linear canonical S transform

被引:0
|
作者
M. Younus Bhat
Aamir H. Dar
机构
[1] Islamic University of Science and Technology Awantipora,Department of Mathematical Sciences
来源
Advances in Operator Theory | 2021年 / 6卷
关键词
Linear canonical S transform; Scaling function; Multiresolution analysis; Orthogonality; 42C40; 42C15; 43A70; 11S85; 47G10;
D O I
暂无
中图分类号
学科分类号
摘要
To deal with the time-varying signals, linear canonical S transform (LCST) is introduced to possess some desirable characteristics that are absent in conventional time–frequency transforms. Inspired by LCST, we in this paper developed an idea of novel MRA associated with LCST. Moreover, the construction method of orthogonal wavelets is developed. Finally an example is provided to justify the results.
引用
收藏
相关论文
共 50 条
  • [1] Multiresolution analysis for linear canonical S transform
    Bhat, M. Younus
    Dar, Aamir H.
    ADVANCES IN OPERATOR THEORY, 2021, 6 (04)
  • [2] Multiresolution analysis for linear canonical wavelet transform
    Guo, Yong
    Yang, Li-Dong
    Li, Bing-Zhao
    IAENG International Journal of Computer Science, 2019, 46 (02) : 358 - 364
  • [3] Nonuniform multiresolution analysis associated with linear canonical transform
    Shah, Firdous A.
    Lone, Waseem Z.
    Mejjaoli, Hatem
    JOURNAL OF PSEUDO-DIFFERENTIAL OPERATORS AND APPLICATIONS, 2021, 12 (01)
  • [4] Linear canonical Stockwell transform and the associated multiresolution analysis
    Gupta, Bivek
    Verma, Amit K.
    MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2024, 47 (11) : 9287 - 9312
  • [5] Nonuniform multiresolution analysis associated with linear canonical transform
    Firdous A. Shah
    Waseem Z. Lone
    Hatem Mejjaoli
    Journal of Pseudo-Differential Operators and Applications, 2021, 12
  • [6] Vector-valued nonuniform multiresolution analysis associated with linear canonical transform domain
    Bhat, M. Younus
    Dar, Aamir H.
    FILOMAT, 2023, 37 (16) : 5165 - 5180
  • [7] Linear Canonical S Transform
    Zhang Wei
    Tao Ran
    Wang Yue
    CHINESE JOURNAL OF ELECTRONICS, 2011, 20 (01): : 63 - 66
  • [8] Linear Canonical Transform
    Ding, Jian-Jiun
    Pei, Soo-Chang
    ADVANCES IN IMAGING AND ELECTRON PHYSICS, VOL 186, 2014, 186 : 39 - 99
  • [9] The analysis of decimation and interpolation in the linear canonical transform domain
    Xu, Shuiqing
    Chai, Yi
    Hu, Youqiang
    Huang, Lei
    Feng, Li
    SPRINGERPLUS, 2016, 5
  • [10] Unitary discrete linear canonical transform: analysis and application
    Zhao, Liang
    Healy, John J.
    Sheridan, John T.
    APPLIED OPTICS, 2013, 52 (07) : C30 - C36
12345