G. P. Bonneau. Multiresolution analysis on irregular surface meshes. IEEE Transactions on Visualization and Computer Graphics, 4(4):365--378, 1998.  Home/Search   Document Details and Download   Summary   Related Articles   Check

....and inverse Wavelet transform. We focused Wavelets on: Multiresolution Geometric Models 34 2.1.1. Wavelets in Multiresolution Geometric Models Lounsbery et al. [17] subdivide a basic mesh applying k disc Wavelets to functions defined over surfaces with connectivity properties. Bonneau [3] introduces a Haar Wavelets decomposition applied to any triangle mesh. Gross [14] proposes to use any Wavelet to control the approximation of an adaptive triangulation of height fields. He uses the detail signal of an inverse Wavelet as a criterion for vertices removal. 2.1.2. Wavelets in ....

G-P.Bonneau. Multiresolution Analysis on Irregular Surface Meshes. IEEE Transactions on Visualization and Computer Graphics, vol.4, n4, Oct-Dec 1998

....reproduce polynomial splines with certain properties, like interpolation or variational subdivision [22] Schroder Sweldens [34] define a variety of subdivision surface wavelets specialized to spherical domains. Piecewise constant approaches were further improved by Nielson et al. 32] and Bonneau [2]. In contrast to regular subdivision rules, signal processing algorithms for meshes that are irregular on every level of resolution are described by Guskov et al. 16] Unfortunately, only few smooth wavelet constructions are known that work efficiently on domains of arbitrary topology and ....

G.-P. Bonneau, Multiresolution analysis on irregular surface meshes, IEEE Transactions on Visualization and Computer Graphics, Vol. 4, No. 4, IEEE, Oct.-Dec. 1998, pp. 365--378.

....Analysis with Non Nested Spaces George Pierre Bonneau introduced in [7] and [5] the concept of multiresolution analysis over non nested spaces, which are generated by the so called BLaC wavelets, a combination of the Haar function with the linear B Spline function. This concept was then used in [8] and [6] to construct a multiresolution analysis over meshes with arbitrary connectivity. 4.3.1 BLaC Wavelets The BLaC scalar function is defined as a blending of an Haar basis function and a linear B Spline basis function, and it is defined as a function which depends on one scalar parameter : ....

G.-P. Bonneau. "Multiresolution analysis on irregular surface meshes." IEEE Transactions on Visualization and Computer Graphics, 4(4), Oct. 1998.

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G. P. Bonneau. Multiresolution analysis on irregular surface meshes. IEEE Transactions on Visualization and Computer Graphics, 4(4):365--378, 1998.

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G.-P. Bonneau, Multiresolution analysis on irregular surface meshes, IEEE TVCG, Vol. 4, No. 4, 1998, pp. 365--378.

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G.-P. Bonneau. Multiresolution analysis on irregular surface meshes. IEEE Transactions on Visualization and Computer Graphics, 4(4):365--378, October /December 1998.

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G.-P. Bonneau, Multiresolution analysis on irregular surface meshes, IEEE Transactions on Visualization and Computer Graphics, Vol. 4, No. 4, IEEE, Oct.-Dec. 1998, pp. 365--378.

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Bonneau G.-P.: Multiresolution analysis on Irregular Surface Meshes. IEEE Transactions on Visualization and Computer Graphics, 4, 365-378 (1998).

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G.-P. Bonneau, "Multiresolution analysis on irregular surface meshes," IEEE Transactions on Visualization and Computer Graphics 4(4), pp. 365--378, 1998.

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G. Bonneau, "Multiresolution analysis on irregular surface meshes," IEEE Trans. on Visualization and Computer Graphics, vol. 4, no. 4, pp. 365--378, 1998.

No context found.

G.-P. Bonneau. Multiresolution analysis on irregular surface meshes. IEEE Transactions on Visualization and Computer Graphics, 4(4):365--378, October /December 1998.

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