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Loïc Mazo
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Documents
Identifiants chercheurs
- loic-mazo
- IdRef : 159247942
- 0000-0001-7937-781X
Présentation
Le monde, manifestement discret, est très bien décrit par les modèles continus. Néanmoins, au fur et a mesure que la puissance de calcul augmente, l'intérêt d'une modélisation intrinséquement discrète se fait de plus en plus évident.
Mes recherches en topologie et géométrie s'inscrivent dans cette quête de la représentation en nombres entiers de phénomènes jusqu'ici décrits de façon continue.
The world, obviously discrete, is very well described by the continuous models. Nevertheless, as the computing power increases, the interest of an intrinsically discrete modeling becomes more and more obvious.
My research in topology and geometry is part of this quest for the representation in integers of phenomena that have been described continuously.
Publications
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Local Turn-Boundedness, a curvature control for continuous curves with application to digitizationJournal of Mathematical Imaging and Vision, 2020, 62 (5), pp.673-692. ⟨10.1007/s10851-020-00952-x⟩
Article dans une revue
hal-02891118v1
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Local Turn-Boundedness, a curvature control for continuous curves with application to digitizationJournal of Mathematical Imaging and Vision, 2020
Article dans une revue
hal-03020607v1
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Locally turn-bounded curves are quasi-regularFirst International Joint Conference, DGMM 2021, Uppsala, Sweden, May 24–27, 2021, May 2021, Uppsala, Sweden. ⟨10.1007/978-3-030-76657-3_14⟩
Communication dans un congrès
hal-03245638v1
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Local turn-boundedness: a curvature control for a good digitization21st IAPR International Conference on Discrete Geometry for Computer Imagery, Mar 2019, Paris, France
Communication dans un congrès
hal-01898138v1
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Monotonic sampling of a continuous closed curve from its Gauss digitization. Application to length estimation2021
Pré-publication, Document de travail
hal-02987858v2
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