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Lifting

1-D and 2-D lifting, Local polynomial transforms, Laurent polynomials

Lifting allows you to progressively design perfect reconstruction filter banks with specific properties. For lifting information and an example, see Lifting Method for Constructing Wavelets.

Fonctions

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filters2lpFilters to Laurent polynomials (depuis R2021b)
liftingSchemeCreate lifting scheme for lifting wavelet transform (depuis R2021a)
liftingStepCreate elementary lifting step (depuis R2021a)
lwt1-D lifting wavelet transform (depuis R2021a)
ilwtInverse 1-D lifting wavelet transform (depuis R2021a)
laurentMatrixCreate Laurent matrix (depuis R2021b)
laurentPolynomialCreate Laurent polynomial (depuis R2021b)
liftfiltApply elementary lifting steps on filters (depuis R2021b)
lwt22-D Lifting wavelet transform (depuis R2021b)
ilwt2Inverse 2-D lifting wavelet transform (depuis R2021b)
lwtcoefExtract or reconstruct 1-D LWT wavelet coefficients and orthogonal projections (depuis R2021a)
lwtcoef2Extract 2-D LWT wavelet coefficients and orthogonal projections (depuis R2021b)
wave2lpLaurent polynomials associated with wavelet (depuis R2021b)
mlptMultiscale local 1-D polynomial transform
imlptInverse multiscale local 1-D polynomial transform
mlptreconReconstruct signal using inverse multiscale local 1-D polynomial transform
mlptdenoiseDenoise signal using multiscale local 1-D polynomial transform

Rubriques