A note on the extension of a family of biorthogonal Coifman wavelet systems

被引:1
|
作者
Jiang, ZH [1 ]
Guo, XL
机构
[1] Univ Western Sydney, Sch Comp & Informat Technol, Penrith, NSW 1797, Australia
[2] Australian Catholic Univ, Management Informat Syst, Strathfield, NSW 2135, Australia
来源
ANZIAM JOURNAL | 2004年 / 46卷
关键词
D O I
10.1017/S1446181100013717
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Wavelet systems with a maximum number of balanced vanishing moments are known to be extremely useful in a variety of applications such as image, and video compression. Tian and Wells recently created a family of such wavelet systems, called the biorthogonal Coifman wavelets, which have proved valuable in both mathematics and applications. The purpose of this work is to establish along with direct proofs a very neat extension of Tian and Wells' family of biorthogonal Coifman wavelets by recovering other "Missing" members of the biorthogonal Coifman wavelet systems.
引用
收藏
页码:111 / 120
页数:10
相关论文
共 50 条
  • [21] The Solution of a Problem of Coifman, Meyer, and Wickerhauser on Wavelet Packets
    Sandra Saliani
    Constructive Approximation, 2011, 33 : 15 - 39
  • [22] A CALCULATION WITH A BIORTHOGONAL WAVELET TRANSFORMATION
    FALOMIR, H
    MUSCHIETTI, MA
    SANTANGELO, EM
    SOLOMIN, J
    JOURNAL OF MATHEMATICAL PHYSICS, 1994, 35 (04) : 1939 - 1950
  • [23] A note on biorthogonal ensembles
    Desrosiers, Patrick
    Forrester, Peter J.
    JOURNAL OF APPROXIMATION THEORY, 2008, 152 (02) : 167 - 187
  • [24] EXTENSION OF WAVELET FAMILY IN FRACTIONAL FOURIER DOMAIN
    Bajaj, Nikesh
    Kashyap, Rahul
    2012 1ST INTERNATIONAL CONFERENCE ON EMERGING TECHNOLOGY TRENDS IN ELECTRONICS, COMMUNICATION AND NETWORKING (ET2ECN), 2012,
  • [25] A NOTE ON BIORTHOGONAL SYSTEMS IN WEAKLY COMPACTLY GENERATED BANACH SPACES
    Fabian, Marian
    Gonzalez, Alma
    Montesinos, Vicente
    ANNALES ACADEMIAE SCIENTIARUM FENNICAE-MATHEMATICA, 2009, 34 (02) : 555 - 564
  • [26] A note on synchronized extension systems
    Tiplea, FL
    Mäkinen, E
    INFORMATION PROCESSING LETTERS, 2001, 79 (01) : 7 - 9
  • [27] Construction of biorthogonal wavelet vectors
    Hwang, Seok Yoon
    Lee, Jeong Yeon
    LINEAR ALGEBRA AND ITS APPLICATIONS, 2011, 434 (04) : 1171 - 1188
  • [28] Quasi-interpolatory refinable functions and construction of biorthogonal wavelet systems
    Kim, Hong Oh
    Kim, Rae Young
    Lee, Yeon Ju
    Yoon, Jungho
    ADVANCES IN COMPUTATIONAL MATHEMATICS, 2010, 33 (03) : 255 - 283
  • [29] Spline Biorthogonal Wavelet Design
    Arathi, T.
    Soman, K. P.
    Parameshwaran, Latha
    INFORMATION AND COMMUNICATION TECHNOLOGIES, 2010, 101 : 672 - +
  • [30] On biorthogonal discrete wavelet bases
    Farkov, Yu. A.
    Rodionov, E. A.
    INTERNATIONAL JOURNAL OF WAVELETS MULTIRESOLUTION AND INFORMATION PROCESSING, 2015, 13 (01)
12345