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Publication detail
ŠLAPAL, J.
Original Title
Structuring digital spaces by path-partition
Type
conference paper
Language
English
Original Abstract
We study closure operators on graphs which are induced by path partitions, i.e., certain sets of paths of the same lengths in these graphs. We investigate connectedness with respect to the closure operators studied. In particular, the closure operators are discussed that are induced by path partitions of some natural graphs on the digital spaces Z^n, n > 0 a natural number. For the case n = 2, i.e., for the digital plane Z^2, the induced closure operators are shown to satisfy an analogue of the Jordan curve theorem which allows using them as convenient background structures for studying digital images.
Keywords
Closure operator, path-partition in a graph, digital space.
Authors
Released
21. 3. 2017
Publisher
Springer Verlag
Location
Berlin
ISBN
978-3-319-54608-7
Book
Computational Modeling of Objects Presented in Images. Fundamentals, Methods, and Applications
Edition
Lecture Notes in Computer Science
0302-9743
Periodical
Year of study
10149
Number
3
State
Federal Republic of Germany
Pages from
43
Pages to
55
Pages count
13
URL
https://link.springer.com/chapter/10.1007/978-3-319-54609-4_3
BibTex
@inproceedings{BUT144421, author="Josef {Šlapal}", title="Structuring digital spaces by path-partition", booktitle="Computational Modeling of Objects Presented in Images. Fundamentals, Methods, and Applications", year="2017", series="Lecture Notes in Computer Science", journal="Lecture Notes in Computer Science", volume="10149", number="3", pages="43--55", publisher="Springer Verlag", address="Berlin", doi="10.1007/978-3-319-54609-4\{_}3", isbn="978-3-319-54608-7", issn="0302-9743", url="https://link.springer.com/chapter/10.1007/978-3-319-54609-4_3" }
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