Periodic and Spline Multiresolution Analysis and the Lifting Scheme
نویسندگان
چکیده
The lifting scheme is a well-known general framework for the construction of wavelets, especially in finitedimensional settings. After a short introduction about the basics of lifting, it is discussed how wavelet constructions in two specific finite settings can be related to the lifting approach. These examples concern on one hand polynomial splines and on the other the Fourier approach for translation invariant spaces of periodic functions.
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