Variation for Piecewise Constant Functions on Triangular Meshes with Applications in Imaging
Journal article
Submitted version
Date
2023Metadata
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- Institutt for matematiske fag [2606]
- Publikasjoner fra CRIStin - NTNU [40027]
Abstract
We propose a novel discrete concept for the total generalized variation (TGV), which was originally derived to reduce the staircasing effect in classical total variation regularization, in image denoising problems. We describe discrete, second-order TGV for piecewise constant functions on triangular meshes, thus allowing the TGV functional to be applied to more general data structures than pixel images, and in particular in the context of finite element discretizations. Particular attention is given to the description of the kernel of the TGV functional, which, in the continuous setting, consists of linear polynomials. We discuss how to take advantage of this kernel structure using piecewise constant functions on triangular meshes. Numerical experiments include denoising and inpainting problems for images defined on nonstandard grids, including data from a three-dimensional scanner. Variation for Piecewise Constant Functions on Triangular Meshes with Applications in Imaging