@inproceedings{7fbe820942804f178736bb9882ec7b53,
title = "A Sobolev-type metric for polar active contours",
abstract = "Polar object representations have proven to be a powerful shape model for many medical as well as other computer vision applications, such as interactive image segmentation or tracking. Inspired by recent work on Sobolev active contours we derive a Sobolev-type function space for polar curves. This so-called polar space is endowed with a metric that allows us to favor origin translations and scale changes over smooth deformations of the curve. Moreover, the resulting curve flow inherits the coarse-to-fine behavior of Sobolev active contours and is thus very robust to local minima. These properties make the resulting polar active contours a powerful segmentation tool for many medical applications, such as cross-sectional vessel segmentation, aneurysm analysis, or cell tracking.",
author = "Maximilian Baust and Yezzi, {Anthony J.} and Gozde Unal and Nassir Navab",
year = "2011",
doi = "10.1109/CVPR.2011.5995310",
language = "English",
isbn = "9781457703942",
series = "Proceedings of the IEEE Computer Society Conference on Computer Vision and Pattern Recognition",
publisher = "IEEE Computer Society",
pages = "1017--1024",
booktitle = "2011 IEEE Conference on Computer Vision and Pattern Recognition, CVPR 2011",
address = "United States",
}