Convexity preserving deformations of digital sets: Characterization of removable and insertable pixels

Lama Tarsissi; Yukiko Kenmochi; Pascal Romon; David Coeurjolly; Jean-Pierre Borel

doi:10.1016/j.dam.2023.08.016

Journal Articles Discrete Applied Mathematics Year : 2023

Convexity preserving deformations of digital sets: Characterization of removable and insertable pixels

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Lama Tarsissi

Function : Author
PersonId : 22086
IdHAL : lama-tarsissi
ORCID : 0000-0002-1932-4676
IdRef : 230528988

Sorbonne university Abu Dhabi

Laboratoire d'Informatique Gaspard-Monge

Yukiko Kenmochi

Function : Author
PersonId : 740084
IdHAL : yukiko-kenmochi
ORCID : 0000-0001-9648-326X
IdRef : 167397664

Equipe Image - Laboratoire GREYC - UMR6072

Pascal Romon

Function : Author
PersonId : 5040
IdHAL : pascal-romon
ORCID : 0000-0001-8002-3779
IdRef : 158472594

Laboratoire Analyse et de Mathématiques Appliquées

David Coeurjolly

Function : Author
PersonId : 2745
IdHAL : david-coeurjolly
ORCID : 0000-0003-3164-8697
IdRef : 069654972

Origami

Jean-Pierre Borel

Function : Author

XLIM

Abstract

In this paper, we are interested in digital convexity. This notion is applied in several domains like image processing and discrete tomography. We choose to study the inflation and deflation of digital convex sets while maintaining the convexity property. Knowing that any digital convex set can be read and identified by its boundary word, we use the combinatorics on words perspective instead of a purely geometric approach. In this context, we characterize the points that can be added or removed over the digital convex sets without loosing its convexity. Some algorithms are given at the end of each section with examples on each process.

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Mathematics [math]

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Submitted on : Thursday, August 31, 2023-2:58:35 PM

Last modification on : Thursday, May 16, 2024-3:00:05 PM

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hal-03712662 , version 1 (05-09-2022)

hal-03712662 , version 2 (31-08-2023)

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HAL Id : hal-03712662 , version 2
DOI : 10.1016/j.dam.2023.08.016

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Lama Tarsissi, Yukiko Kenmochi, Pascal Romon, David Coeurjolly, Jean-Pierre Borel. Convexity preserving deformations of digital sets: Characterization of removable and insertable pixels. Discrete Applied Mathematics, 2023, 341, pp.270-289. ⟨10.1016/j.dam.2023.08.016⟩. ⟨hal-03712662v2⟩

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Convexity preserving deformations of digital sets: Characterization of removable and insertable pixels

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