An Efficient Approximation Method for Piecewise Smooth Signal

doi:10.3969/j.issn.0372-2112.2016.08.033

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An Efficient Approximation Method for Piecewise Smooth Signal

更新时间：2025-07-08

- An Efficient Approximation Method for Piecewise Smooth Signal
- Acta Electronica Sinica Vol. 44, Issue 8, Pages: 2004-2008(2016)
- 作者机构：
  
  1. 江南大学数字媒体学院,江苏,无锡,214122
  2. 江南大学数字媒体学院,江苏,无锡,214122
- 作者简介：
- 基金信息：
- DOI：10.3969/j.issn.0372-2112.2016.08.033
  CLC： TP302.4
- Published：2016
- 稿件说明：
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An Efficient Approximation Method for Piecewise Smooth Signal[J]. Acta Electronica Sinica, 2016, 44(8): 2004-2008.
DOI：

An Efficient Approximation Method for Piecewise Smooth Signal[J]. Acta Electronica Sinica, 2016, 44(8): 2004-2008. DOI： 10.3969/j.issn.0372-2112.2016.08.033.

摘要

传统的Fourier变换，连续小波变换等方法在逼近具有分段光滑特性的非连续信号时，因Gibbs现象的干扰会产生比较大的误差.本文提出了一种有效的分段光滑信号逼近方法.首先根据给定信号的分段点位置，构造一组标准正交分段多项式系，该函数系具有正交性，收敛性及再生性.然后将信号在该函数系下进行正交分解及重构，即可得到该信号的最佳平方逼近结果.数值实验表明，本文方法比传统的正交基具有更好的逼近结果.

Abstract

The truncating Fourier and continue wavelet representation of a discontinuous piecewise smooth signal will introduce an unneglectable error which was named as the Gibbs phenomenon. In this paper

we proposed an effective piecewise smooth signal approximation method. Firstly

a set of normal orthogonal piecewise polynomials was constructed according to the given positions of breaking points

and it has the properties of orthogonality

convergence and reproduction. Then the signal was orthogonal decomposed under this basis and the best square approximation result could be obtained using reconstruction. The numerical experiments show that our method have the higher accuracy approximation results than the other basis.

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Related Author

Xiao Chengshan

Related Institution

Dept.of Electronic Engineering,Tsinghua University,Beijing 100084

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