Title :
Optimization of Symmetric Self-Hilbertian Filters for the Dual-Tree Complex Wavelet Transform
Author :
Dumitrescu, Bogdan ; Bayram, ÿIlker ; Selesnick, Ivan W.
Author_Institution :
Tampere Univ. of Technol., Tampere
fDate :
6/30/1905 12:00:00 AM
Abstract :
In this letter, we expand upon the method of Tay for the design of orthonormal ldquoQ-shiftrdquo filters for the dual-tree complex wavelet transform. The method of Tay searches for good Hilbert-pairs in a one-parameter family of conjugate-quadrature filters that have one vanishing moment less than the Daubechies conjugate-quadrature filters (CQFs). In this letter, we compute feasible sets for one- and two-parameter families of CQFs by employing the trace parameterization of nonnegative trigonometric polynomials and semidefinite programming. This permits the design of CQF pairs that define complex wavelets that are more nearly analytic, yet still have a high number of vanishing moments.
Keywords :
filtering theory; filters; polynomials; wavelet transforms; Daubechies conjugate-quadrature filters; dual-tree complex wavelet transform; nonnegative trigonometric polynomials; orthonormal Q-shift filters; semidefinite programming; symmetric self-Hilbertian filters; trace parameterization; Design methodology; Filter bank; Finite impulse response filter; Helium; Optimization methods; Polynomials; Signal processing; Virtual manufacturing; Wavelet analysis; Wavelet transforms; Complex wavelet; Hilbert pair; orthogonal filter banks; positive trigonometric polynomials;
Journal_Title :
Signal Processing Letters, IEEE
DOI :
10.1109/LSP.2007.913609
