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- Legendre_wavelet abstract "In functional analysis, compactly supported wavelets derived from Legendre polynomials are termed Legendre wavelets or spherical harmonic wavelets. Legendre functions have widespread applications in which spherical coordinate system is appropriate. As with many wavelets there is no nice analytical formula for describing these harmonic spherical wavelets. The low-pass filter associated to Legendre multiresolution analysis is a finite impulse response (FIR) filter. Wavelets associated to FIR filters are commonly preferred in most applications. An extra appealing feature is that the Legendre filters are linear phase FIR (i.e. multiresolution analysis associated with linear phase filters). These wavelets have been implemented on MATLAB (wavelet toolbox). Although being compactly supported wavelet, legdN are not orthogonal (but for N = 1).".
- Legendre_wavelet thumbnail Figura_legd1.jpg?width=300.
- Legendre_wavelet wikiPageExternalLink Legendre_WSEAS.PDF.
- Legendre_wavelet wikiPageID "12120792".
- Legendre_wavelet wikiPageLength "8740".
- Legendre_wavelet wikiPageOutDegree "21".
- Legendre_wavelet wikiPageRevisionID "581733042".
- Legendre_wavelet wikiPageWikiLink Cascade_algorithm.
- Legendre_wavelet wikiPageWikiLink Category:Functional_analysis.
- Legendre_wavelet wikiPageWikiLink Category:Wavelets.
- Legendre_wavelet wikiPageWikiLink Finite_impulse_response.
- Legendre_wavelet wikiPageWikiLink Functional_analysis.
- Legendre_wavelet wikiPageWikiLink Haar_wavelet.
- Legendre_wavelet wikiPageWikiLink Legendre_polynomials.
- Legendre_wavelet wikiPageWikiLink Linear_phase.
- Legendre_wavelet wikiPageWikiLink Low-pass_filter.
- Legendre_wavelet wikiPageWikiLink MATLAB.
- Legendre_wavelet wikiPageWikiLink Multiresolution_analysis.
- Legendre_wavelet wikiPageWikiLink Quadrature_mirror_filter.
- Legendre_wavelet wikiPageWikiLink Roll-off.
- Legendre_wavelet wikiPageWikiLink Spherical_coordinate_system.
- Legendre_wavelet wikiPageWikiLink Wavelet.
- Legendre_wavelet wikiPageWikiLink Wavelet_packet_decomposition.
- Legendre_wavelet wikiPageWikiLink Wavelet_packets.
- Legendre_wavelet wikiPageWikiLink File:Figura_legd1.jpg.
- Legendre_wavelet wikiPageWikiLink File:Figura_legd2.jpg.
- Legendre_wavelet wikiPageWikiLink File:Figura_legd3.jpg.
- Legendre_wavelet wikiPageWikiLink File:Figura_legd5.jpg.
- Legendre_wavelet wikiPageWikiLinkText "Legendre wavelet".
- Legendre_wavelet wikiPageWikiLinkText "Legendre".
- Legendre_wavelet hasPhotoCollection Legendre_wavelet.
- Legendre_wavelet wikiPageUsesTemplate Template:Reflist.
- Legendre_wavelet subject Category:Functional_analysis.
- Legendre_wavelet subject Category:Wavelets.
- Legendre_wavelet hypernym Wavelets.
- Legendre_wavelet type Function.
- Legendre_wavelet type Wavelet.
- Legendre_wavelet comment "In functional analysis, compactly supported wavelets derived from Legendre polynomials are termed Legendre wavelets or spherical harmonic wavelets. Legendre functions have widespread applications in which spherical coordinate system is appropriate. As with many wavelets there is no nice analytical formula for describing these harmonic spherical wavelets. The low-pass filter associated to Legendre multiresolution analysis is a finite impulse response (FIR) filter.".
- Legendre_wavelet label "Legendre wavelet".
- Legendre_wavelet sameAs m.02vqgk3.
- Legendre_wavelet sameAs Q6517888.
- Legendre_wavelet sameAs Q6517888.
- Legendre_wavelet wasDerivedFrom Legendre_wavelet?oldid=581733042.
- Legendre_wavelet depiction Figura_legd1.jpg.
- Legendre_wavelet isPrimaryTopicOf Legendre_wavelet.