2006
DOI: 10.1007/s00371-006-0074-7
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Efficient wavelet construction with Catmull–Clark subdivision

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Cited by 30 publications
(29 citation statements)
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“…For testing the stability of wavelet transform, we made a noise-filtering experiment, which is often used to examine the stability of approximate subdivision wavelets [10][11][12][13][14][15]. We first perturb all vertices of the mesh at highest resolution with white noise.…”
Section: Resultsmentioning
confidence: 99%
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“…For testing the stability of wavelet transform, we made a noise-filtering experiment, which is often used to examine the stability of approximate subdivision wavelets [10][11][12][13][14][15]. We first perturb all vertices of the mesh at highest resolution with white noise.…”
Section: Resultsmentioning
confidence: 99%
“…Li et al [11] proposed unlifted Loop subdivision wavelet by optimizing free parameters in the extended subdivisions. Wang et al [12] developed an effective wavelet construction based on general CatmullClark subdivisions and the resulted wavelets have better fitting quality than the previous Catmull-Clark like subdivision wavelets. They also constructed several new biorthogonal wavelets based on 3 subdivision over triangular meshes, and approximate and interpolatory 2 subdivision over quadrilateral meshes [13][14][15].…”
Section: Related Workmentioning
confidence: 99%
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“…Then an implicit interpolate can be obtained by taking a convex combination of contour representation [16], or implying the distance function [12,16]). Wang et al, [17] used Catmull-Clark subdivision for biorthogonal wavelet construction based on lifting scheme. Loop and Schafefer, [18] approximated Catmull-Clark subdivision surfaces by minimal set of bicubic patch.…”
Section: Previous Workmentioning
confidence: 99%
“…In addition, we provide 4-fold symmetric biorthogonal FIR filter banks and construct the associated wavelets, with both the dyadic and √ 2 refinements. Furthermore, we show that some filter banks constructed in this paper result in very simple multiresolution decomposition and reconstruction algorithms as those in Bertram (Computing 72(1-2): [29][30][31][32][33][34][35][36][37][38][39]2004) and Wang et al :874-884, 2006; IEEE Trans Vis Comput Graph 13 (5): [914][915][916][917][918][919][920][921][922][923][924][925]2007). Our method can provide the filter banks corresponding to the multiresolution algorithms in Wang et al : [874][875][876][877][878][879][880][881][882][883][884]2006) for dyadic multiresolution quad surface processing.…”
mentioning
confidence: 99%