English

Geodesic Models with Convexity Shape Prior

Computer Vision and Pattern Recognition 2022-11-28 v2

Abstract

The minimal geodesic models based on the Eikonal equations are capable of finding suitable solutions in various image segmentation scenarios. Existing geodesic-based segmentation approaches usually exploit image features in conjunction with geometric regularization terms, such as Euclidean curve length or curvature-penalized length, for computing geodesic curves. In this paper, we take into account a more complicated problem: finding curvature-penalized geodesic paths with a convexity shape prior. We establish new geodesic models relying on the strategy of orientation-lifting, by which a planar curve can be mapped to an high-dimensional orientation-dependent space. The convexity shape prior serves as a constraint for the construction of local geodesic metrics encoding a particular curvature constraint. Then the geodesic distances and the corresponding closed geodesic paths in the orientation-lifted space can be efficiently computed through state-of-the-art Hamiltonian fast marching method. In addition, we apply the proposed geodesic models to the active contours, leading to efficient interactive image segmentation algorithms that preserve the advantages of convexity shape prior and curvature penalization.

Keywords

Cite

@article{arxiv.2111.00794,
  title  = {Geodesic Models with Convexity Shape Prior},
  author = {Da Chen and Jean-Marie Mirebeau and Minglei Shu and Xuecheng Tai and Laurent D. Cohen},
  journal= {arXiv preprint arXiv:2111.00794},
  year   = {2022}
}

Comments

This paper has been accepted by TPAMI

R2 v1 2026-06-24T07:20:33.639Z