Multiphase Local Mean Geodesic Active Regions

Department of Computer Science

Multiphase Local Mean Geodesic Active Regions

Research output: Chapter in Book/Report/Conference proceeding › Article in proceedings › Research › peer-review

Standard

Multiphase Local Mean Geodesic Active Regions. / Hansen, Jacob Daniel Kirstejn; Lauze, Francois Bernard.

Proceedings, 24th International Conference on Pattern Recognition (ICPR). IEEE, 2018. p. 3031- 3036.

Research output: Chapter in Book/Report/Conference proceeding › Article in proceedings › Research › peer-review

Harvard

Hansen, JDK & Lauze, FB 2018, Multiphase Local Mean Geodesic Active Regions. in Proceedings, 24th International Conference on Pattern Recognition (ICPR). IEEE, pp. 3031- 3036, ICPR, Beijing, China, 20/08/2018. https://doi.org/10.1109/ICPR.2018.8545684

APA

Hansen, J. D. K., & Lauze, F. B. (2018). Multiphase Local Mean Geodesic Active Regions. In Proceedings, 24th International Conference on Pattern Recognition (ICPR) (pp. 3031- 3036). IEEE. https://doi.org/10.1109/ICPR.2018.8545684

Vancouver

Hansen JDK, Lauze FB. Multiphase Local Mean Geodesic Active Regions. In Proceedings, 24th International Conference on Pattern Recognition (ICPR). IEEE. 2018. p. 3031- 3036 https://doi.org/10.1109/ICPR.2018.8545684

Author

Hansen, Jacob Daniel Kirstejn ; Lauze, Francois Bernard. / Multiphase Local Mean Geodesic Active Regions. Proceedings, 24th International Conference on Pattern Recognition (ICPR). IEEE, 2018. pp. 3031- 3036

Bibtex

@inproceedings{74204ead47574f34839b6c1ba7c3a254,

title = "Multiphase Local Mean Geodesic Active Regions",

abstract = "This paper presents two variational multiphase segmentation methods for recovery of segments in weakly structured images, presenting local and global intensity bias fields, as often is the case in micro-tomography. The proposed methods assume a fixed number of classes. They use local image averages as discriminative features and binary labelling for class membership and their relaxation to per pixel/voxel posterior probabilities, Hidden Markov Measure Field Models (HMMFM). The first model uses a Total Variation weighted semi-norm (wTV) for label field regularization, similar to Geodesic Active Contours, but with a different and possibly richer representation. The second model uses a weighted Dirichlet (squared gradient) regularization. Both problems are solved by alternating minimization on computation of local class averages and label fields. The quadratic problem is essentially smooth, except for HMMFM constraints. The wTV problem uses a Chambolle-Pock scheme for label field updates. We demonstrate on synthetic examples the capabilities of the approaches, and illustrate it on a real examples.",

author = "Hansen, {Jacob Daniel Kirstejn} and Lauze, {Francois Bernard}",

year = "2018",

month = aug,

doi = "10.1109/ICPR.2018.8545684",

language = "English",

pages = "3031-- 3036",

booktitle = "Proceedings, 24th International Conference on Pattern Recognition (ICPR)",

publisher = "IEEE",

note = "null ; Conference date: 20-08-2018 Through 24-08-2018",

url = "http://www.icpr2018.org",

}

RIS

TY - GEN

T1 - Multiphase Local Mean Geodesic Active Regions

AU - Hansen, Jacob Daniel Kirstejn

AU - Lauze, Francois Bernard

PY - 2018/8

Y1 - 2018/8

N2 - This paper presents two variational multiphase segmentation methods for recovery of segments in weakly structured images, presenting local and global intensity bias fields, as often is the case in micro-tomography. The proposed methods assume a fixed number of classes. They use local image averages as discriminative features and binary labelling for class membership and their relaxation to per pixel/voxel posterior probabilities, Hidden Markov Measure Field Models (HMMFM). The first model uses a Total Variation weighted semi-norm (wTV) for label field regularization, similar to Geodesic Active Contours, but with a different and possibly richer representation. The second model uses a weighted Dirichlet (squared gradient) regularization. Both problems are solved by alternating minimization on computation of local class averages and label fields. The quadratic problem is essentially smooth, except for HMMFM constraints. The wTV problem uses a Chambolle-Pock scheme for label field updates. We demonstrate on synthetic examples the capabilities of the approaches, and illustrate it on a real examples.

AB - This paper presents two variational multiphase segmentation methods for recovery of segments in weakly structured images, presenting local and global intensity bias fields, as often is the case in micro-tomography. The proposed methods assume a fixed number of classes. They use local image averages as discriminative features and binary labelling for class membership and their relaxation to per pixel/voxel posterior probabilities, Hidden Markov Measure Field Models (HMMFM). The first model uses a Total Variation weighted semi-norm (wTV) for label field regularization, similar to Geodesic Active Contours, but with a different and possibly richer representation. The second model uses a weighted Dirichlet (squared gradient) regularization. Both problems are solved by alternating minimization on computation of local class averages and label fields. The quadratic problem is essentially smooth, except for HMMFM constraints. The wTV problem uses a Chambolle-Pock scheme for label field updates. We demonstrate on synthetic examples the capabilities of the approaches, and illustrate it on a real examples.

U2 - 10.1109/ICPR.2018.8545684

DO - 10.1109/ICPR.2018.8545684

M3 - Article in proceedings

SP - 3031

EP - 3036

BT - Proceedings, 24th International Conference on Pattern Recognition (ICPR)

PB - IEEE

Y2 - 20 August 2018 through 24 August 2018

ER -

ID: 217393760