Publication detail
Jordan curve theorems with respect to certain pretopologies on Z^2
ŠLAPAL, J.
Czech title
Věty o Jordanových křivkách vzhledem k jistým pretopologiím na Z^2
English title
Jordan curve theorems with respect to certain pretopologies on Z^2
Type
journal article - other
Language
en
Original abstract
We discuss four quotient pretopologies of a certain basic topology on the digital plane. Three of them are even topologies and include the well-known Khalimsky and Marcus-Wyse topologies. Some known Jordan curves in the basic topology are used to prove Jordan curve theorems that identify Jordan curves among simple closed ones in each of the four quotient pretopologies.
Czech abstract
Jsou studovány čtyři faktorové pretopologie jisté základní topologie na digitální rovině. Tři z nich jsou dokonce topologiemi a zahrnují dobře známé Khalimského a Marcus-Wiseho topologie. Známé Jordanovy křivky v základní topologii jsou užity pro nalezení Jordanových křivek mezi jednoduchými uzavřenými křivkami vzhledem ke každé ze čtyř studovaných faktorových pretopologií. . Some known Jordan curves in the basic topology are used to prove Jordan curve theorems that identify Jordan curves among simple closed ones in each of the four quotient pretopologies.
English abstract
We discuss four quotient pretopologies of a certain basic topology on the digital plane. Three of them are even topologies and include the well-known Khalimsky and Marcus-Wyse topologies. Some known Jordan curves in the basic topology are used to prove Jordan curve theorems that identify Jordan curves among simple closed ones in each of the four quotient pretopologies.
Keywords in Czech
Jordanovy křivky, topologie, faktorová pretopologie.
Keywords in English
Jordan curve, topology, quotient pretopology.
RIV year
2009
Released
21.09.2009
Publisher
Springer
ISSN
0302-9743
Journal
Lecture Notes in Computer Science (IF 0,513)
Volume
5810
Number
1
Pages from–to
252–262
Pages count
11
BIBTEX
@article{BUT49487,
author="Josef {Šlapal},
title="Jordan curve theorems with respect to certain pretopologies on Z^2",
journal="Lecture Notes in Computer Science (IF 0,513)",
year="2009",
volume="5810",
number="1",
month="September",
pages="252--262",
publisher="Springer",
issn="0302-9743"
}