Title :
Multiwavelet prefilters. 1. Orthogonal prefilters preserving approximation order p⩽2
Author :
Hardin, Douglas P. ; Roach, David W.
Author_Institution :
Dept. of Math., Vanderbilt Univ., Nashville, TN, USA
fDate :
8/1/1998 12:00:00 AM
Abstract :
In applications using multiwavelets, there is a necessary step of associating a given discrete signal with a function in the scaling function space V0. This association is equivalent to including a prefilter and a post-filter for the filter bank determined by the underlying multiwavelets. We give a construction for orthogonal (paraunitary) finite-impulse response (FIR) prefilters that preserve the approximation order of a given arbitrary scaling vector Ψ with approximation order p⩽2. We give several such prefilters for the DGHM multiwavelet
Keywords :
approximation theory; filtering theory; interpolation; wavelet transforms; DGHM multiwavelet; FIR prefilters; approximation order preservation; arbitrary scaling vector; filter bank; finite-impulse response; multiwavelet prefilters; orthogonal prefilters; scaling function space; Circuits; Digital signal processing; Equations; Filter bank; Finite impulse response filter; Frequency; Laboratories; Mathematics; Multiresolution analysis; Nonlinear filters;
Journal_Title :
Circuits and Systems II: Analog and Digital Signal Processing, IEEE Transactions on
