非下采样小波变换中近似分量的信号恢复

International Conference on Neural Networks and Signal Processing, 2003. Proceedings of the 2003 Pub Date : 1900-01-01 DOI:10.1109/ICNNSP.2003.1279372

J. T. Hsu, B. Tian, Ching-Chung Li, Qiang Liu, Lin-Sen Pon, Mingui Sun, R. Sclabassi

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引用次数: 4

摘要

众所周知，一个信号可以由它的小波分解分量(一个近似分量和一组细节分量)完美地重建出来。如果没有细节分量，信号能从其近似分量中恢复吗?本文用非下采样小波变换给出了这个问题的答案。我们的实验和分析表明，仅通过迭代地进行非下采样小波变换就可以从其近似系数中恢复信号。2级和4级小波变换结果表明，随着迭代次数的增加，恢复信号收敛于原始信号。

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Signal recovery from the approximation component in the non-downsampled wavelet transform

It is well known that a signal can be perfectly reconstructed from its wavelet-decomposed components: an approximation component and a set of detail components. Can a signal be recovered from its approximation component without detail components? This paper gives an answer to this question using a non-downsampled wavelet transform. Our experiments and analyses show that a signal can be recovered from its approximation coefficients solely by performing the non-downsampled wavelet transform iteratively. The results from the 2-level and 4-level wavelet transforms show that the recovered signal converges to the original signal as the number of iteration increases.

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International Conference on Neural Networks and Signal Processing, 2003. Proceedings of the 2003

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