Difference between revisions of "Publications/boutry.21.dgmm.3"
From LRDE
(Created page with "{{Publication | published = true | date = 2021-03-02 | authors = Nicolas Boutry, Guillaume Tochon | title = Stability of the Tree of Shapes to Additive Noise | booktitle = Pro...") |
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| booktitle = Proceedings of the IAPR International Conference on Discrete Geometry and Mathematical Morphology (DGMM) |
| booktitle = Proceedings of the IAPR International Conference on Discrete Geometry and Mathematical Morphology (DGMM) |
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| address = Uppsala, Sweden |
| address = Uppsala, Sweden |
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+ | | publisher = Springer |
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+ | | pages = 365 to 377 |
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| abstract = The tree of shapes (ToS) is a famous self-dual hierarchical structure in mathematical morphology, which represents the inclusion relationship of the shapes (i.e. the interior of the level lines with holes filled) in a grayscale image. The ToS has already found numerous applications in image processing tasks, such as grain filtering, contour extraction, image simplification, and so on. Its structure consistency is bound to the cleanliness of the level lines, which are themselves deeply affected by the presence of noise within the image. However, according to our knowledge, no one has measured before how resistant to (additive) noise this hierarchical structure is. In this paper, we propose and compare several measures to evaluate the stability of the ToS structure to noise. |
| abstract = The tree of shapes (ToS) is a famous self-dual hierarchical structure in mathematical morphology, which represents the inclusion relationship of the shapes (i.e. the interior of the level lines with holes filled) in a grayscale image. The ToS has already found numerous applications in image processing tasks, such as grain filtering, contour extraction, image simplification, and so on. Its structure consistency is bound to the cleanliness of the level lines, which are themselves deeply affected by the presence of noise within the image. However, according to our knowledge, no one has measured before how resistant to (additive) noise this hierarchical structure is. In this paper, we propose and compare several measures to evaluate the stability of the ToS structure to noise. |
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| lrdeprojects = Olena |
| lrdeprojects = Olena |
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| lrdenewsdate = 2021-03-02 |
| lrdenewsdate = 2021-03-02 |
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− | | note = To appear |
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| type = inproceedings |
| type = inproceedings |
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| id = boutry.21.dgmm.3 |
| id = boutry.21.dgmm.3 |
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+ | | identifier = doi:10.1007/978-3-030-76657-3_26 |
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| bibtex = |
| bibtex = |
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@InProceedings<nowiki>{</nowiki> boutry.21.dgmm.3, |
@InProceedings<nowiki>{</nowiki> boutry.21.dgmm.3, |
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month = <nowiki>{</nowiki>May<nowiki>}</nowiki>, |
month = <nowiki>{</nowiki>May<nowiki>}</nowiki>, |
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address = <nowiki>{</nowiki>Uppsala, Sweden<nowiki>}</nowiki>, |
address = <nowiki>{</nowiki>Uppsala, Sweden<nowiki>}</nowiki>, |
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+ | publisher = <nowiki>{</nowiki>Springer<nowiki>}</nowiki>, |
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+ | pages = <nowiki>{</nowiki>365--377<nowiki>}</nowiki>, |
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abstract = <nowiki>{</nowiki>The tree of shapes (ToS) is a famous self-dual |
abstract = <nowiki>{</nowiki>The tree of shapes (ToS) is a famous self-dual |
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hierarchical structure in mathematical morphology, which |
hierarchical structure in mathematical morphology, which |
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measures to evaluate the stability of the ToS structure to |
measures to evaluate the stability of the ToS structure to |
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noise.<nowiki>}</nowiki>, |
noise.<nowiki>}</nowiki>, |
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− | + | doi = <nowiki>{</nowiki>10.1007/978-3-030-76657-3_26<nowiki>}</nowiki> |
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<nowiki>}</nowiki> |
<nowiki>}</nowiki> |
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Revision as of 20:00, 21 May 2021
- Authors
- Nicolas Boutry, Guillaume Tochon
- Where
- Proceedings of the IAPR International Conference on Discrete Geometry and Mathematical Morphology (DGMM)
- Place
- Uppsala, Sweden
- Type
- inproceedings
- Publisher
- Springer
- Projects
- Olena
- Date
- 2021-03-02
Abstract
The tree of shapes (ToS) is a famous self-dual hierarchical structure in mathematical morphology, which represents the inclusion relationship of the shapes (i.e. the interior of the level lines with holes filled) in a grayscale image. The ToS has already found numerous applications in image processing tasks, such as grain filtering, contour extraction, image simplification, and so on. Its structure consistency is bound to the cleanliness of the level lines, which are themselves deeply affected by the presence of noise within the image. However, according to our knowledge, no one has measured before how resistant to (additive) noise this hierarchical structure is. In this paper, we propose and compare several measures to evaluate the stability of the ToS structure to noise.
Bibtex (lrde.bib)
@InProceedings{ boutry.21.dgmm.3, author = {Nicolas Boutry and Guillaume Tochon}, title = {Stability of the Tree of Shapes to Additive Noise}, booktitle = {Proceedings of the IAPR International Conference on Discrete Geometry and Mathematical Morphology (DGMM)}, year = 2021, month = {May}, address = {Uppsala, Sweden}, publisher = {Springer}, pages = {365--377}, abstract = {The tree of shapes (ToS) is a famous self-dual hierarchical structure in mathematical morphology, which represents the inclusion relationship of the shapes (\textit{i.e.} the interior of the level lines with holes filled) in a grayscale image. The ToS has already found numerous applications in image processing tasks, such as grain filtering, contour extraction, image simplification, and so on. Its structure consistency is bound to the cleanliness of the level lines, which are themselves deeply affected by the presence of noise within the image. However, according to our knowledge, no one has measured before how resistant to (additive) noise this hierarchical structure is. In this paper, we propose and compare several measures to evaluate the stability of the ToS structure to noise.}, doi = {10.1007/978-3-030-76657-3_26} }