English

Total Roto-Translational Variation

Numerical Analysis 2018-07-31 v2

Abstract

We consider curvature depending variational models for image regularization, such as Euler's elastica. These models are known to provide strong priors for the continuity of edges and hence have important applications in shape-and image processing. We consider a lifted convex representation of these models in the roto-translation space: In this space, curvature depending variational energies are represented by means of a convex functional defined on divergence free vector fields. The line energies are then easily extended to any scalar function. It yields a natural generalization of the total variation to the roto-translation space. As our main result, we show that the proposed convex representation is tight for characteristic functions of smooth shapes. We also discuss cases where this representation fails. For numerical solution, we propose a staggered grid discretization based on an averaged Raviart-Thomas finite elements approximation. This discretization is consistent, up to minor details, with the underlying continuous model. The resulting non-smooth convex optimization problem is solved using a first-order primal-dual algorithm. We illustrate the results of our numerical algorithm on various problems from shape-and image processing.

Keywords

Cite

@article{arxiv.1709.09953,
  title  = {Total Roto-Translational Variation},
  author = {Antonin Chambolle and Thomas Pock},
  journal= {arXiv preprint arXiv:1709.09953},
  year   = {2018}
}

Comments

new version: included more references, better quality figures (HAL seems to allow transfer of eps figures only) identical to hal-01831614 which is v2 of hal-01593823

R2 v1 2026-06-22T21:57:47.062Z