Title :
ETHFB: a new class of even-length wavelet filters for Hilbert pair design
Author_Institution :
Dept. of Electron. Eng., LaTrobe Univ., Bundoora, Vic.
Abstract :
A new class of biorthogonal filter banks, called the even-triplet-halfband-filter-bank (ETHFB), is introduced here. The filters have even-length, and are used to match a given odd-length filter bank such that the equivalent wavelet functions of both filter banks are approximate Hilbert transform of each other, ie. Hilbert pair. There are two versions of the ETHFB and they are modifications of the (odd-length) triplet-halfband-filter-bank. The parametric Bernstein polynomial is utilized in the construction of the three kernels that define the ETHFB. The determination of the design parameters of the filter bank is achieved through an efficient least squares method
Keywords :
Hilbert transforms; channel bank filters; least squares approximations; polynomials; wavelet transforms; Hilbert pair design; Hilbert transform; biorthogonal filter banks; even triplet halfband filter bank; least squares method; parametric Bernstein polynomial; wavelet filters; wavelet functions; Australia; Design engineering; Equations; Filter bank; Frequency response; Least squares approximation; Least squares methods; Matched filters; Nonlinear filters; Wavelet analysis;
Conference_Titel :
Circuits and Systems, 2006. ISCAS 2006. Proceedings. 2006 IEEE International Symposium on
Conference_Location :
Island of Kos
Print_ISBN :
0-7803-9389-9
DOI :
10.1109/ISCAS.2006.1692777
