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Publication detail
ŠLAPAL, J.
Original Title
A 3D digital Jordan-Brouwer separation theorem
Type
journal article in Web of Science
Language
English
Original Abstract
We introduce and discuss a concept of connectedness induced by an n-ary relation (n>1 an integer). In particular, for every integer n>1, we define an n-ary relation R on the digital line Z and equip the digital space with the n-ary relation S obtained as a special product of three copies of R. For n=2, the connectedness induced by S coincides with the connectedness given by the Khalimsky topology on the 3D digital space and we show that, for every integer n>2, it allows for a digital analog of the Jordan-Brouwer separation theorem for three-dimensional spaces. An advantage of the connectedness induced by S over that given by the Khalimsky topology is shown, too.
Keywords
n-ary relation, connectedness, digital space, digital surface, Jordan-Brouwer separation theorem
Authors
Released
17. 7. 2020
ISBN
1807-0302
Periodical
COMPUTATIONAL & APPLIED MATHEMATICS
Year of study
39
Number
11
State
Federative Republic of Brazil
Pages from
1
Pages to
10
Pages count
URL
https://link.springer.com/content/pdf/10.1007%2Fs40314-020-01249-w.pdf
BibTex
@article{BUT168535, author="Josef {Šlapal}", title="A 3D digital Jordan-Brouwer separation theorem", journal="COMPUTATIONAL & APPLIED MATHEMATICS", year="2020", volume="39", number="11", pages="1--10", doi="10.1007/s40314-020-01249-w", issn="1807-0302", url="https://link.springer.com/content/pdf/10.1007%2Fs40314-020-01249-w.pdf" }
Documents
CompApMath2020.pdf