We introduce a novel computational framework for digital geometry processing, based upon the derivation of a nonlinear operator associated to the total variation functional. Such an operator admits a generalized notion of spectral decomposition, yielding a convenient multiscale representation akin to Laplacian-based methods, while at the same time avoiding undesirable over-smoothing effects typical of such techniques. Our approach entails accurate, detail-preserving decomposition and manipulation of 3D shape geometry while taking an especially intuitive form: non-local semantic details are well separated into different bands, which can then be filtered and re-synthesized with a straightforward linear step. Our computational framework is flexible, can be applied to a variety of signals, and is easily adapted to different geometry representations, including triangle meshes and point clouds. We showcase our method through multiple applications in graphics, ranging from surface and signal denoising to enhancement, detail transfer, and cubic stylization.

Nonlinear spectral geometry processing via the TV transform / Fumero, M.; Moller, M.; Rodola, E.. - In: ACM TRANSACTIONS ON GRAPHICS. - ISSN 0730-0301. - 39:6(2020), pp. 1-16. [10.1145/3414685.3417849]

Nonlinear spectral geometry processing via the TV transform

Fumero, M.;Rodola, E.
2020

Abstract

We introduce a novel computational framework for digital geometry processing, based upon the derivation of a nonlinear operator associated to the total variation functional. Such an operator admits a generalized notion of spectral decomposition, yielding a convenient multiscale representation akin to Laplacian-based methods, while at the same time avoiding undesirable over-smoothing effects typical of such techniques. Our approach entails accurate, detail-preserving decomposition and manipulation of 3D shape geometry while taking an especially intuitive form: non-local semantic details are well separated into different bands, which can then be filtered and re-synthesized with a straightforward linear step. Our computational framework is flexible, can be applied to a variety of signals, and is easily adapted to different geometry representations, including triangle meshes and point clouds. We showcase our method through multiple applications in graphics, ranging from surface and signal denoising to enhancement, detail transfer, and cubic stylization.
2020
spectral geometry; total variation
01 Pubblicazione su rivista::01a Articolo in rivista
Nonlinear spectral geometry processing via the TV transform / Fumero, M.; Moller, M.; Rodola, E.. - In: ACM TRANSACTIONS ON GRAPHICS. - ISSN 0730-0301. - 39:6(2020), pp. 1-16. [10.1145/3414685.3417849]
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11573/1485439
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