Difference between revisions of "Publications/geraud.17.ismm"
From LRDE
| Line 6: | Line 6: | ||
| booktitle = Mathematical Morphology and Its Application to Signal and Image Processing -- Proceedings of the 13th International Symposium on Mathematical Morphology (ISMM) |
| booktitle = Mathematical Morphology and Its Application to Signal and Image Processing -- Proceedings of the 13th International Symposium on Mathematical Morphology (ISMM) |
||
| editors = J Angulo, S Velasco-Forero, F Meyer |
| editors = J Angulo, S Velasco-Forero, F Meyer |
||
| − | | |
+ | | volume = 10225 |
| series = Lecture Notes in Computer Science |
| series = Lecture Notes in Computer Science |
||
| + | | pages = 55 to 67 |
||
| address = Fontainebleau, France |
| address = Fontainebleau, France |
||
| publisher = Springer |
| publisher = Springer |
||
| lrdeinc = Publications/geraud.17.ismm.inc |
| lrdeinc = Publications/geraud.17.ismm.inc |
||
| − | | note = To appear. |
||
| lrdeprojects = Olena |
| lrdeprojects = Olena |
||
| abstract = The minimum barrier (MB) distance is defined as the minimal interval of gray-level values in an image along a path between two points, where the image is considered as a vertex-valued graph. Yet this definition does not fit with the interpretation of an image as an elevation map, i.e. a somehow continuous landscape. In this paper, based on the discrete set-valued continuity setting, we present a new discrete definition for this distance, which is compatible with this interpretation, while being free from digital topology issues. Amazingly, we show that the proposed distance is related to the morphological tree of shapeswhich in addition allows for a fast and exact computation of this distance. That contrasts with the classical definition of the MB distance, where its fast computation is only an approximation. |
| abstract = The minimum barrier (MB) distance is defined as the minimal interval of gray-level values in an image along a path between two points, where the image is considered as a vertex-valued graph. Yet this definition does not fit with the interpretation of an image as an elevation map, i.e. a somehow continuous landscape. In this paper, based on the discrete set-valued continuity setting, we present a new discrete definition for this distance, which is compatible with this interpretation, while being free from digital topology issues. Amazingly, we show that the proposed distance is related to the morphological tree of shapeswhich in addition allows for a fast and exact computation of this distance. That contrasts with the classical definition of the MB distance, where its fast computation is only an approximation. |
||
| Line 29: | Line 29: | ||
year = <nowiki>{</nowiki>2017<nowiki>}</nowiki>, |
year = <nowiki>{</nowiki>2017<nowiki>}</nowiki>, |
||
editor = <nowiki>{</nowiki>J. Angulo and S. Velasco-Forero and F. Meyer<nowiki>}</nowiki>, |
editor = <nowiki>{</nowiki>J. Angulo and S. Velasco-Forero and F. Meyer<nowiki>}</nowiki>, |
||
| − | + | volume = <nowiki>{</nowiki>10225<nowiki>}</nowiki>, |
|
series = <nowiki>{</nowiki>Lecture Notes in Computer Science<nowiki>}</nowiki>, |
series = <nowiki>{</nowiki>Lecture Notes in Computer Science<nowiki>}</nowiki>, |
||
| ⚫ | |||
month = may, |
month = may, |
||
address = <nowiki>{</nowiki>Fontainebleau, France<nowiki>}</nowiki>, |
address = <nowiki>{</nowiki>Fontainebleau, France<nowiki>}</nowiki>, |
||
publisher = <nowiki>{</nowiki>Springer<nowiki>}</nowiki>, |
publisher = <nowiki>{</nowiki>Springer<nowiki>}</nowiki>, |
||
| ⚫ | |||
abstract = <nowiki>{</nowiki>The minimum barrier (MB) distance is defined as the |
abstract = <nowiki>{</nowiki>The minimum barrier (MB) distance is defined as the |
||
minimal interval of gray-level values in an image along a |
minimal interval of gray-level values in an image along a |
||
Revision as of 16:42, 9 May 2017
- Authors
- Thierry Géraud, Yongchao Xu, Edwin Carlinet, Nicolas Boutry
- Where
- Mathematical Morphology and Its Application to Signal and Image Processing -- Proceedings of the 13th International Symposium on Mathematical Morphology (ISMM)
- Place
- Fontainebleau, France
- Type
- inproceedings
- Publisher
- Springer
- Projects
- Olena
- Keywords
- Image
- Date
- 2017-02-23
Abstract
The minimum barrier (MB) distance is defined as the minimal interval of gray-level values in an image along a path between two points, where the image is considered as a vertex-valued graph. Yet this definition does not fit with the interpretation of an image as an elevation map, i.e. a somehow continuous landscape. In this paper, based on the discrete set-valued continuity setting, we present a new discrete definition for this distance, which is compatible with this interpretation, while being free from digital topology issues. Amazingly, we show that the proposed distance is related to the morphological tree of shapeswhich in addition allows for a fast and exact computation of this distance. That contrasts with the classical definition of the MB distance, where its fast computation is only an approximation.
Documents
(some materials will be published here soon...)
Bibtex (lrde.bib)
@InProceedings{ geraud.17.ismm,
author = {Thierry G\'eraud and Yongchao Xu and Edwin Carlinet and
Nicolas Boutry},
title = {Introducing the {D}ahu Pseudo-Distance},
booktitle = {Mathematical Morphology and Its Application to Signal and
Image Processing -- Proceedings of the 13th International
Symposium on Mathematical Morphology (ISMM)},
year = {2017},
editor = {J. Angulo and S. Velasco-Forero and F. Meyer},
volume = {10225},
series = {Lecture Notes in Computer Science},
pages = {55--67},
month = may,
address = {Fontainebleau, France},
publisher = {Springer},
abstract = {The minimum barrier (MB) distance is defined as the
minimal interval of gray-level values in an image along a
path between two points, where the image is considered as a
vertex-valued graph. Yet this definition does not fit with
the interpretation of an image as an elevation map, i.e. a
somehow continuous landscape. In this paper, based on the
discrete set-valued continuity setting, we present a new
discrete definition for this distance, which is compatible
with this interpretation, while being free from digital
topology issues. Amazingly, we show that the proposed
distance is related to the morphological tree of shapes,
which in addition allows for a fast and exact computation
of this distance. That contrasts with the classical
definition of the MB distance, where its fast computation
is only an approximation.}
}