Continuous wavelet transform involving canonical convolution

被引:2
|
作者
Ansari, Zamir Ahmad [1 ]
机构
[1] Indian Sch Mines, Indian Inst Technol, Dept Appl Math, Dhanbad 826004, Bihar, India
来源
ASIAN-EUROPEAN JOURNAL OF MATHEMATICS | 2020年 / 13卷 / 06期
关键词
Linear canonical transform; continuous wavelet transform; Schwartz space; convolution; canonical wavelet;
D O I
10.1142/S1793557120501041
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
The main objective of this paper is to study the continuous wavelet transform in terms of canonical convolution and its adjoint. A relation between the canonical convolution operator and inverse linear canonical transform is established. The continuity of continuous wavelet transform on test function space is discussed.
引用
收藏
页数:14
相关论文
共 50 条
  • [1] Continuous Wavelet Transform Involving Linear Canonical Transform
    Akhilesh Prasad
    Z. A. Ansari
    [J]. National Academy Science Letters, 2019, 42 : 337 - 344
  • [2] Continuous Wavelet Transform Involving Linear Canonical Transform
    Prasad, Akhilesh
    Ansari, Z. A.
    [J]. NATIONAL ACADEMY SCIENCE LETTERS-INDIA, 2019, 42 (04): : 337 - 344
  • [3] Wavelet Convolution Product Involving Fractional Fourier Transform
    S. K. Upadhyay
    Jitendra Kumar Dubey
    [J]. Fractional Calculus and Applied Analysis, 2017, 20 : 173 - 189
  • [4] WAVELET CONVOLUTION PRODUCT INVOLVING FRACTIONAL FOURIER TRANSFORM
    Upadhyay, S. K.
    Dubey, Jitendra Kumar
    [J]. FRACTIONAL CALCULUS AND APPLIED ANALYSIS, 2017, 20 (01) : 173 - 189
  • [5] Generalized wavelet transform based on the convolution operator in the linear canonical transform domain
    Wei, Deyun
    Li, Yuan-Min
    [J]. OPTIK, 2014, 125 (16): : 4491 - 4496
  • [6] Wave packet transform and wavelet convolution product involving the index Whittaker transform
    Maan, Jeetendrasingh
    Prasad, Akhilesh
    [J]. RAMANUJAN JOURNAL, 2024, 64 (01): : 19 - 36
  • [7] Wave packet transform and wavelet convolution product involving the index Whittaker transform
    Jeetendrasingh Maan
    Akhilesh Prasad
    [J]. The Ramanujan Journal, 2024, 64 : 19 - 36
  • [8] ON CONVOLUTION FOR WAVELET TRANSFORM
    Pathak, R. S.
    Pathak, Ashish
    [J]. INTERNATIONAL JOURNAL OF WAVELETS MULTIRESOLUTION AND INFORMATION PROCESSING, 2008, 6 (05) : 739 - 747
  • [9] CONVOLUTION AND CORRELATION THEOREMS FOR CONTINUOUS REDUCED BIQUATERNION WAVELET TRANSFORM
    Bahri, Mawardi
    Ashino, Ryuichi
    [J]. PROCEEDINGS OF 2015 INTERNATIONAL CONFERENCE ON WAVELET ANALYSIS AND PATTERN RECOGNITION (ICWAPR), 2015, : 81 - 86
  • [10] The convolution theorem for two-dimensional continuous wavelet transform
    Shi, Zhi
    Wei, Heng-Dong
    [J]. WAVELET ACTIVE MEDIA TECHNOLOGY AND INFORMATION PROCESSING, VOL 1 AND 2, 2006, : 39 - +
12345