Constructing a Hoop Using Rough Filters

Constructing a Hoop Using Rough Filters

When it comes to making decisions in vague problems, rough is one of the best tools to help analyzers. So based on rough and hoop concepts, two kinds of approximations (Lower and Upper) for filters in hoops are defined, and then some properties of them are investigated by us. We prove that these app...

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Veröffentlicht in:Bulletin of the Section of Logic 2022-01, Vol.51 (3), p.363-382
Hauptverfasser: Borzooei, Rajab Ali, Babaei, Elham
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Analyzers
Approximation
hoop
Hoops
Logic
Monoids
rough approximations (lower and upper)
rough filter
rough set
Set theory
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Beschreibung
Zusammenfassung:When it comes to making decisions in vague problems, rough is one of the best tools to help analyzers. So based on rough and hoop concepts, two kinds of approximations (Lower and Upper) for filters in hoops are defined, and then some properties of them are investigated by us. We prove that these approximations- lower and upper- are interior and closure operators, respectively. Also after defining a hyper operation in hoops, we show that by using this hyper operation, set of all rough filters is monoid. For more study, we define the implicative operation on the set of all rough filters and prove that this set with implication and intersection is made a hoop.
ISSN:0138-0680
2449-836X
DOI:10.18778/0138-0680.2022.10