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信号处理中基于最小二乘法的提升小波的构造 被引量:1

Construction of compactly supported biorthogonal wavelet based on lifting scheme
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摘要 在信号处理的应用背景下研究提升小波的构造方法。在提升小波的构造过程中预测算子和更新算子的选取不能混为一谈,为了更准确地将信号分解成低频分量和高频分量,提出更新算子的选取标准是各分量的和等于1/2,利用最小二乘法选取预测算子,并将构造出的提升小波运用于信号消噪,进一步研究预测算子和更新算子的选取规律,得到了较好的实验效果,验证了结论的正确性和实用性。 When construct the lifting wavelet,the methods choosing predicting operator and updating operator are different.In this paper,we make a new criteria how to choose the updating operator in order to decompose signal into low frequency components and high frequency components more accurately,which is that the sum of the updating operator's components is 1/2,and then we choose predicting operator according to the least square theory.Some examples of lifting wavelet are applied to signal de-noising. We search the law of choosing predicting and updating operator,and get a good de-noising result.It proves that this method is valid.
作者 梁茜 丁宣浩 何郁波
机构地区 桂林电子科技大学数学与计算科学学院 怀化学院数学系
出处 《计算机工程与应用》 CSCD 北大核心 2008年第13期156-158,共3页 Computer Engineering and Applications
基金 国家自然科学基金(the National Natural Science Foundation of China under Grant No.10361003) 广西省自然科学基金(the Natural Sci- ence Foundation of Guangxi Province of China under Grant No.0542046) 广西研究生教育创新计划项目( Innovation Project Guangxi Graduate Education,No.2006105950701M03)
关键词 提升方案 更新算子 预测算子 最小二乘法 lifting scheme updating operator predicting operator least square theory
分类号 TN911 [电子电信—通信与信息系统]
  • 相关文献

参考文献8

  • 1Sweldens W.The lifting scheine:a construction of second generation wavelets [J].SIAM Journal Mathematical Analysis, 1997,29 (2) : 511 - 546.
  • 2Daubechies I,Sweldens W.Factoring wavelet transforms into lifting steps[J].Journal of Fourier Analysis and Applications, 1998,4(3): 247-269.
  • 3Sweldens W,Schroder P.Building your own wavelets at home[R]. Columbia:University of South Carolina, 1995.
  • 4马强,林克正,熊常芳.基于第二代小波变换的图像消噪[J].哈尔滨理工大学学报,2005,10(1):132-134. 被引量:4
  • 5范宇,胡访宇,赵爱华.基于非线性提升小波变换的图像去噪[J].计算机仿真,2004,21(9):85-86. 被引量:3
  • 6胡广书.现代信号处理教程[M].北京:清华大学出版社,2005.
  • 7曾剑芬,马争鸣.提升格式:多项式拟合的预测方法[J].电路与系统学报,2001,6(3):62-67. 被引量:5
  • 8Donoho D.De-nosing by soft thresholding[J].IEEE Transactions on Information Theory, 1995,41 (3) :613-627.

二级参考文献19

  • 1[1]Wim Sweldens. The Lifting Scheme: A Construction of Second Generation Wavelets[J]. SIAM J. Math. Anal., 1998, 511-546
  • 2[2]lngrid Daubechies and Wim Sweldens. Factoring Wavelet Transforms into Lifting Steps[R]. Technical report, Bell Laboratories,Lucent Technologies, 1996
  • 3[3]JPEG2000 Part I Final Committee Draft Version 1.0[S], http://www.jpeg.org/FCD15444-1.htm
  • 4[4]Mallat S A. Theory for Multiresolution Signal Decompositions: the Wavelet Representafion[J]. IEEE Trans on PAMI, 1989
  • 5[5]Stoer J and Bulirsh R. Introduction to Numerical Analysis[M]. New York: Springer-Verlag Inc., 1980
  • 6MALLAT S.A Wavelet Tour of Signal Processing(Second Edition)[M]. China Machine Press, 2002.
  • 7DAUB ECHIES I, SWELDENS W. Factoring Wavelet Transforms into Lifting Steps[J].J. Fourier Anal, 1998, 4(3):245-267.
  • 8SWELDENS W. The Lifting Scheme: a Custom-design Construction of Biorthogonal Wavelets[R]. Department of Mathematics, University of South Carolina: Industrial Mathematics Initiative, 1994.
  • 9SWELDENS W. The Lifting Scheme: a Construction of Second Generation Wavelets[J]. SIAM Journal of Mathematical Analysis, 1997, 29(2):511-546.
  • 10W Sweldens. The lifing scheme: A construction of second generation wavelets [J]. SIAM J. Math. Anal. 1998, (29): 511 - 546.

共引文献29

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计算机工程与应用
2008年 第13期

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