Mesh Types for Curvature Regularization
(2011) Swedish Symposium on Image Analysis (SSBA) 2011- Abstract
- Length and area regularization are commonplace for inverse problems today. It has however turned out to be much more difficult to incorporate a curvature prior. In this paper we propose two improvements to a recently proposed framework based on global optimization. The mesh geometry is analyzed both from a theoretical and experimental viewpoint and hexagonal meshes are shown to be superior. Our second contribution is that we generalize the framework to handle mean curvature regularization for 3D surface completion and segmentation.
Please use this url to cite or link to this publication:
https://lup.lub.lu.se/record/1966795
- author
- Strandmark, Petter LU and Kahl, Fredrik LU
- organization
- publishing date
- 2011
- type
- Contribution to conference
- publication status
- unpublished
- subject
- conference name
- Swedish Symposium on Image Analysis (SSBA) 2011
- conference location
- Linköping, Sweden
- conference dates
- 2011-03-17 - 2011-03-18
- language
- English
- LU publication?
- yes
- id
- 317969cf-a6a7-4acc-a344-7e7f910d6a46 (old id 1966795)
- date added to LUP
- 2016-04-04 14:28:19
- date last changed
- 2019-04-30 17:06:59
@misc{317969cf-a6a7-4acc-a344-7e7f910d6a46, abstract = {{Length and area regularization are commonplace for inverse problems today. It has however turned out to be much more difficult to incorporate a curvature prior. In this paper we propose two improvements to a recently proposed framework based on global optimization. The mesh geometry is analyzed both from a theoretical and experimental viewpoint and hexagonal meshes are shown to be superior. Our second contribution is that we generalize the framework to handle mean curvature regularization for 3D surface completion and segmentation.}}, author = {{Strandmark, Petter and Kahl, Fredrik}}, language = {{eng}}, title = {{Mesh Types for Curvature Regularization}}, url = {{https://lup.lub.lu.se/search/files/6368165/1966796.pdf}}, year = {{2011}}, }