Filter banks and wavelets: Extensions and applications

We review the current status of multi!dimensional \_lters bank and wavelet desi`n from the perspective of si`nal and system theory[ The study of wavelets and perfect reconstruction \_lter banks are known to have roots in traditional \_lter desi`n techniques[ On the other hand\ the \_eld of multi!dim

We consider implementation of operators via filter banks in the framework of the multiresolution analysis. Our method is particularly efficient for convolution operators. Although our method of applying operators to functions may be used with any wavelet basis with a sufficient number of vanishing m

More accessible accounts of this work may he found in, for example, [lX, Chap. 4, Section 41 and [19, Chap. Vl where, in addition, similar questions are treated with roughly the same methodology. A wealth of related material can also he found in [201.

The notion of a frame multiresolution analysis (FMRA) is formulated. An FMRA is a natural extension to affine frames of the classical notion of a multiresolution analysis (MRA). The associated theory of FMRAs is more complex than that of MRAs. A basic result of the theory is a characterization of fr