Sublabel-Accurate Relaxation of Nonconvex Energies
Abstract
We propose a novel spatially continuous framework for convex relaxations based on functional lifting. Our method can be interpreted as a sublabel-accurate solution to multilabel problems. We show that previously proposed functional lifting methods optimize an energy which is linear between two labels and hence require (often infinitely) many labels for a faithful approximation. In contrast, the proposed formulation is based on a piecewise convex approximation and therefore needs far fewer labels - see Fig. 1. In comparison to recent MRF-based approaches, our method is formulated in a spatially continuous setting and shows less grid bias. Moreover, in a local sense, our formulation is the tightest possible convex relaxation. It is easy to implement and allows an efficient primal-dual optimization on GPUs. We show the effectiveness of our approach on several computer vision problems.
Cite
Text
Mollenhoff et al. "Sublabel-Accurate Relaxation of Nonconvex Energies." Conference on Computer Vision and Pattern Recognition, 2016. doi:10.1109/CVPR.2016.428Markdown
[Mollenhoff et al. "Sublabel-Accurate Relaxation of Nonconvex Energies." Conference on Computer Vision and Pattern Recognition, 2016.](https://mlanthology.org/cvpr/2016/mollenhoff2016cvpr-sublabelaccurate/) doi:10.1109/CVPR.2016.428BibTeX
@inproceedings{mollenhoff2016cvpr-sublabelaccurate,
title = {{Sublabel-Accurate Relaxation of Nonconvex Energies}},
author = {Mollenhoff, Thomas and Laude, Emanuel and Moeller, Michael and Lellmann, Jan and Cremers, Daniel},
booktitle = {Conference on Computer Vision and Pattern Recognition},
year = {2016},
doi = {10.1109/CVPR.2016.428},
url = {https://mlanthology.org/cvpr/2016/mollenhoff2016cvpr-sublabelaccurate/}
}