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IRAGI, M., ŠLAPAL, J.
Original Title
Transitive quasi-uniform structures depending on a parameter
Type
journal article in Web of Science
Language
English
Original Abstract
In a category C with an (E,M)-factorization structure for morphisms, we prove that any subclass N of M which is closed under pullbacks determines a transitive quasi-uniform structure on C. In addition to providing a categorical characterization of all transitive quasiuniform structures compatible with a topology, this result also permits us to establish a number of Galois connections related to quasi-uniform structures on C. These Galois connections lead to the description of subcategories of C determined by quasi-uniform structures. Several examples considered at the end of the paper illustrate our results.
Keywords
Closure operator, Quasi-uniform structure, Syntopogenous structure, Galois connection, Interior operator.
Authors
Released
10. 8. 2023
Publisher
Springer
Location
Basel
ISBN
0001-9054
Periodical
AEQUATIONES MATHEMATICAE
Year of study
97
Number
4
State
Swiss Confederation
Pages from
823
Pages to
836
Pages count
14
URL
https://link.springer.com/article/10.1007/s00010-022-00937-8
BibTex
@article{BUT183729, author="Josef {Šlapal} and Minani {Iragi}", title="Transitive quasi-uniform structures depending on a parameter", journal="AEQUATIONES MATHEMATICAE", year="2023", volume="97", number="4", pages="823--836", doi="10.1007/s00010-022-00937-8", issn="0001-9054", url="https://link.springer.com/article/10.1007/s00010-022-00937-8" }