Title :
Modulated filter banks and wavelets-a general unified theory
Author_Institution :
Comput. Sci. Dept., IBM Thomas J. Watson Res. Center, Yorktown Heights, NY, USA
Abstract :
This paper generalizes and unifies well-known results on modulated filter banks (MFBs) and modulated wavelet tight frames (MWTFs). It classifies MFBs based on the discrete cosine or sine transforms that they are associated with. By proper choice of the form of modulation the perfect reconstruction (PR) conditions are seen to be (surprisingly) identical for all classes of MFBs. This has the interesting consequence that optimal MFB prototype designs can be shared across MFB classes. For some classes of MFBs associated MWTFs do not exist, while for others they do. The results cover both orthogonal and biorthogonal MFBs; and the filters could be arbitrary sequences in l2(Z)
Keywords :
band-pass filters; discrete cosine transforms; filtering theory; modulation; signal reconstruction; wavelet transforms; DCT; biorthogonal modulated filter banks; discrete cosine transform; discrete sine transform; general unified theory; modulated wavelet tight frames; orthogonal modulated filter banks; perfect reconstruction; sequences; Artificial intelligence; Channel bank filters; Computer science; Discrete cosine transforms; Filter bank; Frequency; Humans; Nonlinear filters; Phase modulation; Prototypes;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 1996. ICASSP-96. Conference Proceedings., 1996 IEEE International Conference on
Conference_Location :
Atlanta, GA
Print_ISBN :
0-7803-3192-3
DOI :
10.1109/ICASSP.1996.544105
