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MRA Parseval frame multiwavelets in \(L^2 (\mathbb R^d)\). (English) Zbl 1297.42050

Summary: In this paper, we characterize multiresolution analysis (MRA) Parseval frame multiwavelets in \(L^2(\mathbb R^d)\) with matrix dilations of the form \((D f )(x) = \sqrt{2}f (Ax)\), where \(A\) is an arbitrary expanding \(d\times d\) matrix with integer coefficients, such that \(|\det A| =2\). We study a class of generalized low pass matrix filters that allow us to define (and construct) the subclass of MRA tight frame multiwavelets. This leads us to an associated class of generalized scaling functions that are not necessarily obtained from a multiresolution analysis. We also investigate several properties of these classes of generalized multiwavelets, scaling functions, matrix filters and give some characterizations about them. Finally, we describe the matrix multiplier classes associated with Parseval frame multiwavelets (PFMWs) in \(L^2(\mathbb R^d)\) and give an example to prove our theory.

MSC:

42C40 Nontrigonometric harmonic analysis involving wavelets and other special systems
42A38 Fourier and Fourier-Stieltjes transforms and other transforms of Fourier type
42C15 General harmonic expansions, frames
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