Abstract
Starting from any two compactly supported refinable functions in L2(R) with dilation factor d,we show that it is always possible to construct 2d wavelet functions with compact support such that they generate a pair of dual d-wavelet frames in L2(R). Moreover, the number of vanishing moments of each of these wavelet frames is equal to the approximation order of the dual MRA; this is the highest possible. In particular, when we consider symmetric refinable functions, the constructed dual wavelets are also symmetric or antisymmetric. As a consequence, for any compactly supported refinable function φ in L2(R), it is possible to construct, explicitly and easily, wavelets that are finite linear combinations of translates φ(d · – k), and that generate a wavelet frame with an arbitrarily preassigned number of vanishing moments.We illustrate the general theory by examples of such pairs of dual wavelet frames derived from B-spline functions.
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Daubechie, I., Han, B. Pairs of Dual Wavelet Frames from Any Two Refinable Functions. Constr Approx 20, 325–352 (2004). https://doi.org/10.1007/s00365-004-0567-4
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DOI: https://doi.org/10.1007/s00365-004-0567-4