Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
9500254 | Applied and Computational Harmonic Analysis | 2005 | 46 Pages |
Abstract
We study Parseval frame wavelets in L2(Rn) with matrix dilations of the form (Df)(x)=2f(Ax), where A is an arbitrary expanding nÃn matrix with integer coefficients, such that |detA|=2. We show that each A-MRA admits either Parseval frame wavelets, or Parseval frame bi-wavelets. The minimal number of generators for a Parseval frame associated with an A-MRA (i.e. 1 or 2) is determined in terms of a scaling function. All Parseval frame (bi)wavelets associated with A-MRA's are described. We then introduce new classes of filter induced wavelets and bi-wavelets. It is proved that these new classes strictly contain the classes of all A-MRA Parseval frame wavelets and bi-wavelets, respectively. Finally, we demonstrate a method of constructing all filter induced Parseval frame (bi)wavelets from generalized low-pass filters.
Related Topics
Physical Sciences and Engineering
Mathematics
Analysis
Authors
Damir BakiÄ, Ilya Krishtal, Edward N. Wilson,