Publication detail
Closure operators associated to ternary relations for structuring the digital plane
ŠLAPAL, J.
English title
Closure operators associated to ternary relations for structuring the digital plane
Type
conference paper
Language
en
Original abstract
We study closure operators associated to ternary relations. We focus on a certain ternary relation on the digital line Z and discuss the closure operator on the digital plane Z^2 associated to a special product of two copies of the relation. This closure operator is shown to allow for an analogue of the Jordan curve theorem, so that it may be used as a background structure on the digital plane for the study of digital images. An advantage of this closure operator over the Khalimsky topology is shown, too.
English abstract
We study closure operators associated to ternary relations. We focus on a certain ternary relation on the digital line Z and discuss the closure operator on the digital plane Z^2 associated to a special product of two copies of the relation. This closure operator is shown to allow for an analogue of the Jordan curve theorem, so that it may be used as a background structure on the digital plane for the study of digital images. An advantage of this closure operator over the Khalimsky topology is shown, too.
Keywords in English
Ternary relation, closure operator, digital space, Khalimsky topology, Jordan curve theorem
Released
31.12.2018
Publisher
Institute of Electrical and Electronics Engineers ( IEEE )
Location
Los Alamitos, CA, USA
ISBN
9781538694695
Book
2018 International Conference on Applied Mathematics & Computational Science, ICAMCS.NET 2018
Edition number
1
Pages from–to
125–128
Pages count
4
BIBTEX
@inproceedings{BUT161342,
author="Josef {Šlapal},
title="Closure operators associated to ternary relations for structuring the digital plane",
booktitle="2018 International Conference on Applied Mathematics & Computational Science, ICAMCS.NET 2018",
year="2018",
month="December",
pages="125--128",
publisher="Institute of Electrical and Electronics Engineers ( IEEE )",
address="Los Alamitos, CA, USA",
isbn="9781538694695"
}