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Multipolar Fuzzy <i>p</i>-Ideals of BCI-Algebrasopen access
- Issue Date
- Nov-2019
- Publisher
- MDPI
- Keywords
- (normal) m-polar (is an element of, is an element of)-fuzzy ideal; (normal) m-polar (is an element of, is an element of)-fuzzy p-ideal
- Citation
- MATHEMATICS, v.7, no.11
- Indexed
- SCIE
SCOPUS
- Journal Title
- MATHEMATICS
- Volume
- 7
- Number
- 11
- ISSN
- 2227-7390
- Abstract
- The notion of (normal) m-polar (is an element of, is an element of)-fuzzy p-ideals of BCI-algebras is introduced, and several properties are investigated. Relations between an m-polar (is an element of, is an element of)-fuzzy ideal and an m-polar (is an element of, is an element of)-fuzzy p-ideal are displayed, and conditions for an m-polar (is an element of, is an element of)-fuzzy ideal to be an m-polar (is an element of, is an element of)-fuzzy p-ideal are provided. Characterization of m-polar (is an element of, is an element of)-fuzzy p-ideals are considered. Given an m-polar (is an element of, is an element of)-fuzzy ideal (resp., m-polar (is an element of, is an element of)-fuzzy p-ideal), a normal m-polar (is an element of, is an element of)-fuzzy ideal (resp., normal m-polar (is an element of, is an element of)-fuzzy p-ideal) is established. Using an m-polar (is an element of, is an element of)-fuzzy ideal, the quotient structure of BCI-algebras is constructed.
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