Title :
SDP Approximation of a Fractional Delay and the Design of Dual-Tree Complex Wavelet Transform
Author :
Dumitrescu, Bogdan
Author_Institution :
Tampere Int. Center for Signal Process., Tampere Univ. of Technol., Tampere
Abstract :
We show that an Hinfin optimization problem related to fractional delay approximation can be formulated as a semideflnite programming (SDP) problem and thus solved reliably. Particularly, given the finite-impulse-response (FIR) filter H(z), we find the FIR filter G(z) of given degree such that ||G(z) - z-1/2H(z)||infin is minimum. This half-sample delay approximation problem is used in the design of filters generating orthogonal dual-tree complex wavelet transforms. Since the solution does not conform to the orthogonality constraints exactly, we propose their enforcement in a second stage of optimization, in which an analyticity criterion is optimized. The proposed designs compare favorably with previous ones.
Keywords :
FIR filters; Hinfin optimisation; approximation theory; delays; signal processing; wavelet transforms; FIR filter; Hinfin optimization problem; finite-impulse-response; fractional delay approximation; orthogonal dual-tree complex wavelet transforms; semideflnite programming; Channel bank filters; Constraint optimization; Design optimization; Filter bank; Finite impulse response filter; Helium; IIR filters; Propagation delay; Wavelet analysis; Wavelet transforms; Bounded real lemma; Hilbert pair; dual-tree wavelet; fractional delay; semidefinite programming (SDP);
Journal_Title :
Signal Processing, IEEE Transactions on
DOI :
10.1109/TSP.2008.924134
