Lifting methods for manifold-valued variational problems
Numerical Analysis
2019-08-13 v1 Numerical Analysis
Abstract
Lifting methods allow to transform hard variational problems such as segmentation and optical flow estimation into convex problems in a suitable higher-dimensional space. The lifted models can then be efficiently solved to a global optimum, which allows to find approximate global minimizers of the original problem. Recently, these techniques have also been applied to problems with values in a manifold. We provide a review of such methods in a refined framework based on a finite element discretization of the range, which extends the concept of sublabel-accurate lifting to manifolds. We also generalize existing methods for total variation regularization to support general convex regularization.
Cite
@article{arxiv.1908.03776,
title = {Lifting methods for manifold-valued variational problems},
author = {Thomas Vogt and Evgeny Strekalovskiy and Daniel Cremers and Jan Lellmann},
journal= {arXiv preprint arXiv:1908.03776},
year = {2019}
}
Comments
In press as part of a Springer Handbook