2007
DOI: 10.1109/tvcg.2007.1031
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√3-Subdivision-Based Biorthogonal Wavelets

Abstract: A new efficient biorthogonal wavelet analysis based on the principal square root of subdivision is proposed in the paper by using the lifting scheme. Since the principal square root of subdivision is of the slowest topological refinement among the traditional triangular subdivisions, the multiresolution analysis based on the principal square root of subdivision is more balanced than the existing wavelet analyses on triangular meshes, and accordingly offers more levels of detail for processing polygonal models.… Show more

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Cited by 29 publications
(31 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%
See 2 more Smart Citations
“…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%
“…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]. Zhang et al presented a biorthogonal wavelet approach based on dual Doo-Sabin subdivision with the aid of the barycenter of the V-faces corresponding to old vertices [16].…”
Section: Related Workmentioning
confidence: 99%
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“…With the idea of lifting scheme, [1] introduces a novel triangle surface multiresolution algorithm which works for both regular and extraordinary vertices. This method is also successfully adopted to develop multiresolution algorithms for quad surface and √ 3-refinement triangle surface processing in [35] and [36] respectively. When considering the biorthogonality, these papers do not use the conventional L 2 (IR 2 ) inner product, and therefore, they do not consider the corresponding lowpass filter, highpass filters, scaling function and wavelets.…”
Section: Introductionmentioning
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%