An approximation of Daubechies wavelet matrices by perfect reconstruction filter banks with rational coefficients
arXiv:1106.54392 citationsh-index: 10
Originality Synthesis-oriented
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This work provides a practical tool for implementing wavelet transforms in hardware or software where rational coefficients are beneficial, but the approach is incremental.
The authors present a method to approximate Daubechies wavelet matrix coefficients with rational numbers while exactly preserving the perfect reconstruction property of the filter bank.
It is described how the coefficients of Daubechies wavelet matrices can be approximated by rational numbers in such a way that the perfect reconstruction property of the filter bank be preserved exactly