Titelangaben
Weiß, Manuel ; Baumgärtner, Lukas ; Weigl, Laura ; Bergmann, Ronny ; Schmidt, Stephan ; Herzog, Roland:
Two Models for Surface Segmentation using the Total Variation of the Normal Vector.
In: Journal of Mathematical Imaging and Vision.
Bd. 68
(2026)
.
- 34.
ISSN 1573-7683
DOI: https://doi.org/10.1007/s10851-026-01303-y
Dies ist die aktuelle Version des Eintrags.
Abstract
We consider the problem of surface segmentation, where the goal is to partition a surface represented by a triangular mesh. The segmentation is based on the similarity of the normal vector field to a given set of label vectors. We propose a variational approach and compare two different regularizers, both based on a total variation measure. The first regularizer penalizes the total variation of the assignment function directly, while the second regularizer penalizes the total variation in the label space. In order to solve the resulting optimization problems, we use variations of the split Bregman (ADMM) iteration adapted to the problem at hand. While computationally more expensive, the second regularizer yields better results in our experiments. In particular it removes noise more reliably in regions of constant curvature. In order to mitigate the computational cost, we present a manifold Newton scheme for the most expensive subproblem, which is related to the Riemannian center of mass on a sphere. This significantly improves the computational cost.
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Two Models for Surface Segmentation using the Total Variation of the Normal Vector. (deposited 02 Mär 2026 07:24)
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